On a New Approach for Stability and Controllability Analysis of Functional Equations

Aderyani, Safoura Rezaei; Saadati, Reza; O’Regan, Donal; Li, Chenkuan

doi:10.3390/math11163458

Open AccessArticle

On a New Approach for Stability and Controllability Analysis of Functional Equations

¹

School of Mathematics, Iran University of Science and Technology, Narmak, Tehran 16844, Iran

²

School of Mathematical and Statistical Sciences, University of Galway, H91 TK33 Galway, Ireland

³

Department of Mathematics and Computer Science, Brandon University, Brandon, MB R7A 6A9, Canada

^*

Author to whom correspondence should be addressed.

Mathematics 2023, 11(16), 3458; https://doi.org/10.3390/math11163458

Submission received: 14 July 2023 / Revised: 1 August 2023 / Accepted: 8 August 2023 / Published: 9 August 2023

(This article belongs to the Special Issue Topological Study on Fuzzy Metric Spaces and Their Generalizations)

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Abstract

:

We consider a new approach to approximate stability analysis for a tri-additive functional inequality and to obtain the optimal approximation for permuting tri-derivations and tri-homomorphisms in unital matrix algebras via the vector-valued alternative fixed-point theorem, which is a popular technique of proving the stability of functional equations. We also present a small list of aggregation functions on the classical, well-known special functions to investigate the best approximation error estimates using a different concept of perturbation stability.

Keywords:

multi stability; approximation

MSC:

17A40; 39B52; 47B47; 39B62; 46L57

1. Introduction and Preliminaries

In recent years, one of the attractive fields of research in the area of functional equations has been devoted to stability analysis. Stability analysis is a basic character of mathematical analysis and has paramount importance in different areas of science and engineering. In the nineteenth century, Ulam [1] proposed the popular Ulam stability of functional equations that was partially solved by Hyers in the Banach space setting [2]. The problem presented by Ulam inspired well-known mathematician such as Brzdek, Cieplinski, Brillouët–Belluot, Gajda, Ger, Šmerl, Sikorska, Fechner, Forti and others; for details and further references see [3,4,5,6,7,8,9,10,11,12,13,14], in particular Bourgin, who presented in [15] some remarks concerning approximately additive mappings.

In 1978, a new concept of Ulam stability was presented by Rassias which led to the improvement of what is known as Hyers–Ulam–Rassias stability of linear mappings [16]. The results were then improved by Aoki who weakened the condition for the bound of the norm of Cauchy difference [17]. As far as we know, works by Obloza [18,19] were among the first contributions dealing with the Ulam-type stability of ODEs. Since then, the stability results of different classes of ODEs and PDEs of fractional order were explored by using a wide spectrum of methods, see [20,21,22,23,24,25,26]. There are now many research papers in the literature which consider generalizations of Hyers–Ulam–Rassias stability for different types of functional equations, functional inequalities and fractional equations [27,28,29,30,31]. For example, in [32,33] Mittag–Leffler–Hyers–Ulam–Rassias stability, hypergeometric-Hyers–Ulam–Rassias stability, Wright–Hyers–Ulam–Rassias stability, and Fox–Hyers–Ulam–Rassias stability are presented.

Hyers’s method, which was applied in [2], is usually named the direct technique, and has been used for investigating the stability of functional equations. However, this technique sometimes does not work (see [34]). Nevertheless, there are other techniques proving the stability results; for instance: the technique applying the notion of shadowing [35], the technique of invariant means [36] and the technique according to sandwich theorems [37]. In this paper, we propose the fixed-point technique that is the most important technique of proposing the stability of diverse mathematical equations. Although it was applyed for the first time by J. A. Baker [38], who used this technique to gain the stability of a functional equation, most authors follow Radu’s technique [39] and apply the Diaz and Margolis theorem.

The major issue we are studying in this paper is that of aggregation maps which play an important role in several technical tasks scholars are faced with nowadays. The mentioned maps refer to the procedure of combining some inputs into one output. The oldest example is the notion of arithmetic mean which has been used throughout the history of empirical sciences. These maps are applied in both applied and pure mathematics (like: probability, theory of means), social sciences (like: psychology), engineering sciences (like: artificial intelligence, image analysis), as well as many other natural sciences [40,41]. In this paper, we apply n-ary aggregation functions on special functions to define a class of matrix-valued controllers which help us to present a concept of Ulam-type stability. The aggregation functions allow us to obtain the best approximation errors [42]. Recently, special functions like Mittag–Leffler function, hypergeometric function, Wright function, Fox H-function, Fox–Wright function, Meijer G-function, G-function and others have received a lot of attention because of their important roles in finding optimal solutions for different types of mathematical equations and their close relations to problems which come from applications [43].

In the present paper, we propose some novel notions concerning a new type of stability of a tri-additive

λ

-fuzzy operator inequality in the Mittag–Leffler–Hyers–Ulam–Rassias sense using some special function which include the one-parameter Mittag–Leffler function, the one-parameter pre-supersine function generated by the Mittag–Leffler function, the one-parameter pre-superhyperbolic supersine function generated by the Mittag–Leffler function, the one-parameter pre-supercosine function generated by the Mittag–Leffler function, and the one-parameter pre-superhyperbolic supercosine function generated by the Mittag–Leffler function. In particular, in this paper, we consider the tri-additive

λ

-fuzzy operator inequality

\begin{matrix} N (χ (λ_{1} + λ_{2}, λ_{3} - λ_{4}, λ_{5} - λ_{6}) + χ (λ_{1} - λ_{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}) \\ - 2 χ (λ_{1}, λ_{3}, λ_{5}) + 2 χ (λ_{1}, λ_{4}, λ_{6}) - 2 χ (λ_{2}, λ_{3}, λ_{6}) + 2 χ (λ_{2}, λ_{4}, λ_{5}), T) \\ ⪰ N (λ [2 χ (\frac{λ_{1} + λ_{2}}{2}, λ_{3} - λ_{4}, λ_{5} + λ_{6}) + 2 χ (\frac{λ_{1} - λ_{2}}{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}) \\ - 2 χ (λ_{1}, λ_{3}, λ_{5}) + 2 χ (λ_{1}, λ_{4}, λ_{6}) - 2 χ (λ_{2}, λ_{3}, λ_{6}) + 2 χ (λ_{2}, λ_{4}, λ_{5})], T) \end{matrix}

(1)

where

0 \neq λ \in C

is fixed and

| λ | < 1

. Further, we get an estimation for permuting tri-homomorphisms and tri-derivations in unital matrix FC-⋄-algebras, associated with the above inequality. As an application, we present a small list of aggregation functions to get diverse estimates depending on the input values and to study optimum stability results and minimal errors that provide a unique optimal solution.

Let

n \in N,

Φ : = [0, 1]

and the following diagonal matrix defined by

Diagonal Υ_{n} (Φ) = \{[\begin{matrix} ψ_{11} & 0 & \dots & 0 \\ 0 & ψ_{22} & ⋱ & ⋮ \\ ⋮ & ⋱ & ⋱ & 0 \\ 0 & \dots & 0 & ψ_{n n} \end{matrix}] = Diagonal [ψ_{11}, \dots, ψ_{n n}], ψ_{i i} \in Φ, i = 1, \dots, n\},

where

Diagonal Υ_{n} (Φ)

is equipped with the partial order relation:

\begin{matrix} ψ : = Diagonal [ψ_{11}, \dots, ψ_{n n}], α : = Diagonal [α_{11}, \dots, α_{n n}] \in Diagonal Υ_{n} (Φ), \\ ψ ⪯ α ⟺ ψ_{i i} \leq α_{i i}, \forall i \in N . \end{matrix}

Also,

ψ ≺ α

denotes that

ψ ⪯ α

and

ψ \neq α; ψ ≪ α

and

ψ_{i i} < α_{i i},

for all

i \in N .

We define

ϱ : = Diagonal [ϱ, \dots, ϱ]

in

Diagonal Υ_{n} (Φ)

in which

ϱ \in Φ .

For example,

0 : = {[\begin{matrix} 0 & 0 & \dots & 0 \\ 0 & 0 & ⋱ & ⋮ \\ ⋮ & ⋱ & ⋱ & 0 \\ 0 & \dots & 0 & 0 \end{matrix}]}_{n \times n} = Diagonal {[0, \dots, 0]}_{n \times n},

and

1 : = {[\begin{matrix} 1 & 0 & \dots & 0 \\ 0 & 1 & ⋱ & ⋮ \\ ⋮ & ⋱ & ⋱ & 0 \\ 0 & \dots & 0 & 1 \end{matrix}]}_{n \times n} = Diagonal {[1, \dots, 1]}_{n \times n} .

Here, we generalize the t-norm

⨂_{TN}

[44] on

Diagonal Υ_{n} (Φ)

.

Definition 1

([45]). A generalized triangular norm (GTN) on

Diagonal Υ_{n} (Φ)

is an operation

⨂_{GTN} : Diagonal Υ_{n} (Φ) \times Diagonal Υ_{n} (Φ) \to Diagonal Υ_{n} (Φ)

s.t.,

(1): $(\forall ψ \in Diagonal Υ_{n} (Φ)) (ψ ⨂_{GTN} 1) = ψ)$ (boundary condition);
(2): $(\forall (ψ, α) \in {(Diagonal Υ_{n} (Φ))}^{2}) (ψ ⨂_{GTN} α = α ⨂_{GTN} ψ)$ (commutativity);
(3): $(\forall (ψ, α, ϕ) \in (Diagonal Υ_{n} {(Φ)}^{3}) (ψ ⨂_{GTN} (α ⨂_{GTN} ϕ) = (ψ ⨂_{GTN} α) ⨂_{GTN} ϕ)$ (associativity);
(4): $(\forall (ψ, ψ^{'}, α, α^{'}) \in (Diagonal Υ_{n} {(Φ)}^{4} (ψ ⪯ ψ^{'} a n d α ⪯ α^{'} ⟹ ψ ⨂_{GTN} α ⪯ ψ^{'} ⨂_{GTN} α^{'}$ (monotonicity).

For all

ψ : = Diagonal [ψ_{11}, \dots, ψ_{n n}], α : = Diagonal [α_{11}, \dots, α_{n n}] \in Diagonal Υ_{n} (Φ)

and all sequences

{{(ψ_{i i})}_{k}}

and

{{(α_{i i})}_{k}},

with

1 \leq i \leq n

and

k > 0,

converging to

ψ_{i i}

and

α_{i i}

, suppose we have

\begin{matrix} lim_{k ⟶ \infty} (Diagonal [{(ψ_{11})}_{k}, \dots, {(ψ_{n n})}_{k}] ⨂_{GTN} Diagonal [{(α_{11})}_{k}, \dots, {(α_{n n})}_{k}]) \\ = Diagonal [ψ_{11}, \dots, ψ_{n n}] ⨂_{GTN} Diagonal [α_{11}, \dots, α_{n n}], \end{matrix}

then,

⨂_{GTN}

on

Diagonal Υ_{n} (Φ)

is a continuous generalized triangular norm (CGTN). Now, we present some examples of continuous generalized triangular norms.

(1): Let $⨂_{GTN}^{P} : Diagonal Υ_{n} (Φ) \times Diagonal Υ_{n} (Φ) \to Diagonal Υ_{n} (Φ)$ , such that,

$\begin{matrix} ψ ⨂_{GTN}^{P} α & = & Diagonal [ψ_{11}, \dots, ψ_{n n}] ⨂_{GTN}^{P} Diagonal [α_{11}, \dots, α_{n n}] \\ = & Diagonal [ψ_{11} . α_{11}, \dots, ψ_{n n} . α_{n n}], \end{matrix}$

then, $⨂_{GTN}^{P}$ is a CGTN.
(2): Let $⨂_{GTN}^{M} : Diagonal Υ_{n} (Φ) \times Diagonal Υ_{n} (Φ) \to Diagonal Υ_{n} (Φ)$ , such that,

$\begin{matrix} ψ ⨂_{GTN}^{M} α & = & Diagonal [ψ_{11}, \dots, ψ_{n n}] ⨂_{GTN}^{M} Diagonal [α_{11}, \dots, α_{n n}] \\ = & Diagonal [min {ψ_{11}, α_{11}}, \dots, min {ψ_{n n}, α_{n n}}], \end{matrix}$

then, $⨂_{GTN}^{M}$ is a CGTN.
(3): Let $⨂_{GTN}^{L} : Diagonal Υ_{n} (Φ) \times Diagonal Υ_{n} (Φ) \to Diagonal Υ_{n} (Φ)$ , such that,

$\begin{matrix} ψ ⨂_{GTN}^{L} α & = & Diagonal [ψ_{11}, \dots, ψ_{n n}] ⨂_{GTN}^{L} Diagonal [α_{11}, \dots, α_{n n}] \\ = & Diagonal [max {ψ_{11} + α_{11} - 1, 0}, \dots, max {ψ_{n n} + α_{n n} - 1, 0}], \end{matrix}$

then, $⨂_{GTN}^{L}$ is a CGTN.

Here, we present some numeric examples:

Diagonal [\frac{1}{2}, 0.2, 1] ⨂_{GTN}^{M} Diagonal [\frac{3}{10}, 0.7, 0] = [\begin{matrix} \frac{1}{2} \\ 0.2 \\ 1 \end{matrix}] ⨂_{GTN}^{M} [\begin{matrix} \frac{3}{10} \\ 0.7 \\ 0 \end{matrix}] = [\begin{matrix} \frac{3}{10} \\ 0.2 \\ 0 \end{matrix}]

Diagonal [\frac{1}{2}, 0.2, 1] ⨂_{GTN}^{P} Diagonal [\frac{3}{10}, 0.7, 0] = [\begin{matrix} \frac{1}{2} \\ 0.2 \\ 1 \end{matrix}] ⨂_{GTN}^{P} [\begin{matrix} \frac{3}{10} \\ 0.7 \\ 0 \end{matrix}] = [\begin{matrix} \frac{3}{20} \\ \frac{7}{50} \\ 0 \end{matrix}]

Diagonal [\frac{1}{2}, 0.2, 1] ⨂_{GTN}^{L} Diagonal [\frac{3}{10}, 0.7, 0] = [\begin{matrix} \frac{1}{2} \\ 0.2 \\ 1 \end{matrix}] ⨂_{GTN}^{L} [\begin{matrix} \frac{3}{10} \\ 0.7 \\ 0 \end{matrix}] = [\begin{matrix} 0 \\ 0 \\ 0 \end{matrix}]

Then, we get

\begin{matrix} Diagonal [\frac{1}{2}, 0.2, 1] ⨂_{GTN}^{M} Diagonal [\frac{3}{10}, 0.7, 0] \\ ⪰ & Diagonal [\frac{1}{2}, 0.2, 1] ⨂_{GTN}^{P} Diagonal [\frac{3}{10}, 0.7, 0] \\ ⪰ & Diagonal [\frac{1}{2}, 0.2, 1] ⨂_{GTN}^{L} Diagonal [\frac{3}{10}, 0.7, 0] . \end{matrix}

We are interested in defining a multi-control function using some known special functions, and to achieve it, we apply diagonal matrices as the values of control functions instead of finite sequences, because the value of a control function must be a member of a topological monoid with a unit (i.e., 1) with the monotonicity property (Definition 1, (4)).

Let

ξ

be a vector space and

T > 0 .

We denote the set of a matrix valued fuzzy set by

Λ^{*}

. Now,

N \in Λ^{*}

denotes

N : ξ \times (0, + \infty) ⟶ Diagonal Υ_{n} (Φ)

s.t.,

$N$ is continuous;
$N (ζ, .)$ is non-decreasing, for every $ζ \in ξ;$
${lim}_{T \to + \infty} (ζ, T) = 1,$ for every $ζ \in ξ .$

In

Λ^{*}

, we denote

“ ⪯ ”

as follows:

N ⪯ N_{\circ} ⟺ N (ζ, T) ⪯ N_{\circ} (ζ, T^{'}), \forall T^{'}, T > 0, and ζ \in ξ .

Definition 2

([45]). Consider the CGTN

⨂_{GTN}

, a vector space ξ and a matrix valued fuzzy set

N : ξ \times (0, + \infty) ⟶ Diagonal Υ_{n} (Φ)

. In this case, we define a matrix valued fuzzy norm

N

as follows:

(D-1)

N (ζ, T) = 1

for any

T > 0

if and only if

ζ = 0

;

(D-2)

N (ȷ ζ, T) = N (ζ, \frac{T}{| ȷ |})

for any

ζ \in ξ, T > 0,

and

0 \neq ȷ \in C

;

(D-3)

N (ζ + ζ^{'}, T + T^{'}) ⪰ N (ζ, T) ⨂_{GTN} N (ζ^{'}, T^{'})

for all

ζ, ζ^{'} \in ξ

and

T, T^{'} \geq 0

;

(D-4)

{lim}_{T \to + \infty} N (ζ, T) = 1,

for all

ζ \in ξ .

Now,

(ξ, N, ⨂_{GTN})

, is called a matrix valued fuzzy normed space (MFN-space).

For example, the matrix valued fuzzy set

N

N (ζ, T) = Diagonal [exp (- \frac{∥ ζ ∥}{T}), \frac{T}{T + ∥ ζ ∥}],

is a matrix valued fuzzy norm, where

T > 0

and

(ξ, N, ⨂_{GTN}^{M})

is an MFN-space and

(ξ, ∥ \cdot ∥)

is a linear normed space.

Definition 3

([45]). Consider the MFN-space

(ξ, N, ⨂_{GTN})

and the CGTNs

⨂_{GTN}

and

⨁_{GTN}

. If

(D-5)

N (ζ ζ^{'}, T T^{'}) ⪰ N (ζ, T) ⨁_{GTN} N (ζ^{'}, T^{'})

for any

ζ, ζ^{'} \in ξ

and any

T^{'}, T > 0,

then

(ξ, N, ⨂_{GTN}, ⨁_{GTN})

is called a matrix fuzzy normed algebra (MFN-algebra).

If

∥ ζ ζ^{'} ∥ \leq ∥ ζ ∥ ∥ ζ^{'} ∥ + T^{'} ∥ ζ^{'} ∥ + T ∥ ζ ∥ (ζ, ζ^{'} \in (ξ, ∥ \cdot ∥); T, T^{'} > 0),

then,

N (ζ, T) = Diagonal [\frac{1}{e^{\frac{∥ ζ ∥}{T}}}, \frac{1}{1 + \frac{∥ ζ ∥}{T}}],

for any

T > 0,

is a matrix fuzzy normed algebra

(ξ, N, ⨂_{GTN}^{M}, ⨂_{GTN}^{P})

and vice versa. A complete matrix fuzzy normed algebra is called a matrix fuzzy Banach algebra (or MFB-algebra).

Let

(ξ, N, ⨂_{GTN}, ⨁_{GTN})

be an MFB-algebra. An involution on

ξ

is a mapping

ζ \to ζ^{⋄}

from

ξ

into

ξ

, s.t.,

(1): $ζ^{⋄ ⋄} = ζ$ for any $ζ \in ξ$ ;
(2): ${(φ ζ + ϕ ζ)}^{⋄} = \bar{φ} ζ^{⋄} + \bar{ϕ} ζ^{⋄}$ , for any $ζ \in ξ$ ;
(3): ${(ζ ζ^{'})}^{⋄} = ζ^{' ⋄} m^{⋄}$ for any $ζ, ζ^{'} \in ξ$ .

Then,

ξ

is called an MFB-⋄-algebra. In addition, if

N (ζ^{⋄} ζ, T) = N (ζ, T)

for all

ζ \in ξ

and

T > 0

, then

ξ

is called an MFC-⋄-algebra.

Here, we denote the unital MFC-⋄-algebra

(ξ, N, ⨂_{GTN}, ⨁_{GTN})

with unit e and the unitary group

U (ξ) = {θ \in ξ : θ^{⋄} θ = θ θ^{⋄} = e}

.

Definition 4

([45]). A mapping

ϖ : ν^{3} \to ν

is called tri-additive, if

\begin{matrix} ϖ (α + ϵ, β, γ) = ϖ (α, β, γ) + ϖ (ϵ, β, γ), \\ ϖ (α, β + ϵ, γ) = ϖ (α, β, γ) + ϖ (α, ϵ, γ), \\ ϖ (α, β, γ + ϵ) = ϖ (α, β, γ) + ϖ (α, β, ϵ), \end{matrix}

for every

α, γ, β, ϵ \in ν .

Definition 5

([45]). Consider the ring ν. A tri-additive mapping

ϖ : ν^{3} \to ν

is a permuting tri-derivation on ν if we have

\begin{matrix} ϖ (λ_{1} λ_{2}, λ_{3}, λ_{4}) & = & ϖ (λ_{1}, λ_{3}, λ_{4}) λ_{2} + λ_{1} ϖ (λ_{2}, λ_{3}, λ_{4}), \\ ϖ (ℓ_{β (1)}, ℓ_{β (2)}, ℓ_{β (3)}) & = & ϖ (ℓ_{1}, ℓ_{2}, ℓ_{3}) \end{matrix}

for all permutations

(β (1), β (2), β (3))

of

(1, 2, 3)

, and for all

λ_{1}, \dots, λ_{4}, ℓ_{1}, ℓ_{2}, ℓ_{3} \in ν

.

Definition 6

([45]). Consider two complex Banach algebras ν and Θ. A

C -

trilinear mapping

ρ : ν^{3} \to Θ

is a permuting tri-homomorphism if we have

\begin{matrix} ρ (λ_{1} λ_{2}, λ_{3} λ_{4}, λ_{5} λ_{6}) & = & ρ (λ_{1}, λ_{3}, λ_{5}) ρ (λ_{2}, λ_{4}, λ_{6}), \\ ρ (ℓ_{β (1)}, ℓ_{β (2)}, ℓ_{β (3)}) & = & ρ (ℓ_{1}, ℓ_{2}, ℓ_{3}) \end{matrix}

for all permutations

(β (1), β (2), β (3))

of

(1, 2, 3)

, and for all

λ_{1}, \dots, λ_{4}, ℓ_{1}, ℓ_{2}, ℓ_{3} \in ν

.

Next, we propose vector valued generalized metric spaces.

Definition 7.

Let

ℏ = (ℏ_{1}, \dots, ℏ_{m})

and

γ = (γ_{1}, \dots, γ_{m}), m \in N

. Thus, we have

ℏ ⪯ γ ⟺ ℏ_{j} \leq γ_{j}, j = 1, \dots, m;

and also

ℏ \to 0 ⟺ ℏ_{j} \to 0, j = 1, \dots, m .

Definition 8

([46]). Consider the nonempty set

J

and a given mapping

ℏ : J^{2} \to {[0, + \infty]}^{m}, m \in N .

A generalized metric ℏ on

J

is a function s.t.,

(1): for all $(ϵ_{1}, ϵ_{2}) \in J^{2}$ , we get

$ℏ (ϵ_{1}, ϵ_{2}) = 0 = \underset{m}{\underset{⏟}{(0, \dots, 0)}} ⟺ ϵ_{1} = ϵ_{2};$
(2): for all $(ϵ_{1}, ϵ_{2}) \in J^{2}$ , we get

$ℏ (ϵ_{1}, ϵ_{2}) = ℏ (ϵ_{1}, ϵ_{2}) ⟺ ϵ_{1} = ϵ_{2};$
(3): for all $ϵ_{1}, ϵ_{2}, ι \in J$ , we get

$ℏ (ϵ_{1}, ι) + ℏ (ι, ϵ_{2}) ⪰ ℏ (ϵ_{1}, ϵ_{2}) .$

Theorem 1

([46]). Let

m \in N

and consider a function

ℏ : J^{2} \to {[0, + \infty]}^{m},

and a complete generalized metric space

(J, ℏ)

. Consider a strictly contractive function

Γ : J \to J

with Lipschitz constant

T < 1

. Then, for any

ϑ \in J

, either

ℏ (Γ^{n} ϑ, Γ^{n + 1} ϑ) = \underset{m}{\underset{⏟}{(+ \infty, \dots, + \infty)}}

for all

n \in N \cup {0}

or there exists an

n_{0} \in N

s.t.

(1): $ℏ (Γ^{n} ϑ, Γ^{n + 1} ϑ) \leq {\underset{⏟}{(+ \infty, \dots, + \infty)}}_{m}, \forall n \geq n_{0}$ ;
(2): The fixed point $κ^{*}$ of Γ is a convergence point of the sequence ${Γ^{n} ϑ}$ and is unique in the set $J^{'} = {κ \in J ∣ ℏ (Γ^{n_{0}} ϑ, κ) \leq {\underset{⏟}{(+ \infty, \dots, + \infty)}}_{m}}$ ;
(3): $ℏ (κ, κ^{*}) \leq \frac{1}{1 - T} ℏ (κ, Γ κ)$ for every $κ \in J^{'}$ .

Consider the MFN-space

G

, the MFB-space

P

and the MFB-algebras

ν

and

Θ

and also let

λ \in C

s.t.

| λ | < 1

.

2. Tri-Additive $λ$ -Functional Inequality (1)

Using Theorem 1, we study the multi stability of the functional Equation (1) in MFB-algebras.

Lemma 1.

Let W be a linear space and

χ : W^{3} \to W

be a function satisfying (1), for any

λ_{i} \in W, i = 1, \dots, 6 .

Let

χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, 0, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = χ (λ_{1}, 0, 0) = χ (λ_{2}, 0, λ_{5}) = χ (λ_{2}, λ_{3}, 0) = 0

, for any

λ_{i} \in W, i = 1, 2, 3, 5 .

Then,

χ : W \to W

is tri-additive.

Proof.

Putting

λ_{1} = λ_{2}

and

λ_{4} = λ_{6} = 0

in (1), we have

χ (2 λ_{1}, λ_{3}, λ_{5}) = 2 χ (λ_{1}, λ_{3}, λ_{5}), \forall λ_{1}, λ_{3}, λ_{5} \in W .

Thus,

\begin{matrix} N (χ (λ_{1} + λ_{2}, λ_{3} - λ_{4}, λ_{5} - λ_{6}) + χ (λ_{1} - λ_{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}) \\ - 2 χ (λ_{1}, λ_{3}, λ_{5}) + 2 χ (λ_{1}, λ_{4}, λ_{6}) - 2 χ (λ_{2}, λ_{3}, λ_{6}) + 2 χ (λ_{2}, λ_{4}, λ_{5}), T) \\ ⪰ N (λ [χ (λ_{1} + λ_{2}, λ_{3} - λ_{4}, λ_{5} + λ_{6}) + χ (λ_{1} - λ_{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}) \\ - 2 χ (λ_{1}, λ_{3}, λ_{5}) + 2 χ (λ_{1}, λ_{4}, λ_{6}) - 2 χ (ϖ, λ_{2}, λ_{3}, λ_{6}) + 2 χ (λ_{2}, λ_{4}, λ_{5})], T), \end{matrix}

(2)

and so

\begin{matrix} χ (λ_{1} + λ_{2}, λ_{3} - λ_{4}, λ_{5} - λ_{6}) + χ (λ_{1} - λ_{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}) \\ - 2 χ (λ_{1}, λ_{3}, λ_{5}) + 2 χ (λ_{1}, λ_{4}, λ_{6}) - 2 χ (λ_{2}, λ_{3}, λ_{6}) + 2 χ (λ_{2}, λ_{4}, λ_{5}) = 0, \end{matrix}

(3)

for all

λ_{i} \in W, i = 1, \dots, 6 .

Now, putting

λ_{4} = λ_{6} = 0

in (3), we have

\begin{matrix} χ (λ_{1} + λ_{2}, λ_{3}, λ_{5}) + χ (λ_{1} - λ_{2}, λ_{3}, λ_{5}) \\ = 2 χ (λ_{1}, λ_{3}, λ_{5}), \end{matrix}

(4)

and so

\begin{matrix} χ (λ, λ_{3}, λ_{5}) + χ (ℓ, λ_{3}, λ_{5}) \\ = 2 χ (\frac{λ + ℓ}{2}, λ_{3}, λ_{5}) = χ (λ + ℓ, λ_{3}, λ_{5}), \end{matrix}

(5)

for all

λ = λ_{1} + λ_{2}

,

ℓ = λ_{1} - λ_{2}

,

λ_{3}, λ_{4}, λ_{5}, λ_{6} \in W .

Since

| λ | < 1,

χ : W^{3} \to W

is additive in the second variable. In a similar way, we have that

χ : W^{3} \to W

is additive both in the second and in the third variable. Thus,

χ : W^{3} \to W

is tri-additive. □

Theorem 2.

Suppose

i = 1, \dots, n

and

n \in N .

Let

(G, N, ⨂_{GTN}^{M}, ⨂_{GTN}^{M})

be an MFB-algebra, and

E_{i} : G^{6} \times (0, + \infty) \to Φ

be a fuzzy control function s.t. there exists a

ϑ_{i} < 1

with

\begin{matrix} E_{i} (\frac{λ_{1}}{2}, \frac{λ_{2}}{2}, \frac{λ_{3}}{2}, \frac{λ_{4}}{2}, \frac{λ_{5}}{2}, \frac{λ_{6}}{2}, T) ⪰ E_{i} (λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6}, \frac{2}{ϑ_{i}} T) \end{matrix}

(6)

and

lim_{j \to \infty} E_{i} (\frac{λ_{1}}{2^{j}}, \frac{λ_{2}}{2^{j}}, \frac{λ_{3}}{2^{j}}, \frac{λ_{4}}{2^{j}}, \frac{λ_{5}}{2^{j}}, \frac{λ_{6}}{2^{j}}, \frac{T}{2^{j}}) = 1,

(7)

for all

λ_{i} \in G, i = 1, \dots, 6

and

T > 0

. Let the fuzzy operator

χ : G^{3} \to P

satisfying

χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, 0, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = χ (λ_{1}, 0, 0) = χ (λ_{2}, 0, λ_{5}) = χ (λ_{2}, λ_{3}, 0) = 0

and

\begin{matrix} N (χ (λ_{1} + λ_{2}, λ_{3} - λ_{4}, λ_{5} - λ_{6}) + χ (λ_{1} - λ_{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}) \\ - 2 χ (λ_{1}, λ_{3}, λ_{5}) + 2 χ (λ_{1}, λ_{4}, λ_{6}) - 2 χ (λ_{2}, λ_{3}, λ_{6}) + 2 χ (λ_{2}, λ_{4}, λ_{5}), T) \\ ⪰ N (J [2 χ (\frac{λ_{1} + λ_{2}}{2}, λ_{3} - λ_{4}, λ_{5} + λ_{6}) + 2 χ (\frac{λ_{1} - λ_{2}}{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}) \\ - 2 χ (λ_{1}, λ_{3}, λ_{5}) + 2 χ (λ_{1}, λ_{4}, λ_{6}) - 2 χ (λ_{2}, λ_{3}, λ_{6}) + 2 χ (λ_{2}, λ_{4}, λ_{5})], T) \\ ⨂_{GTN} Diagonal [E_{1} (λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6}, T), \dots, E_{n} (λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6}, T)] . \end{matrix}

(8)

Then, there exists a unique tri-additive mapping

χ^{'} : G^{3} \to P

satisfying

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - χ^{'} (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, (1 - 4 ϑ_{1}) T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{(1 - 4 ϑ_{1}) T}{2}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{(1 - 4 ϑ_{1}) T}{4}), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, (1 - 4 ϑ_{n}) T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{(1 - 4 ϑ_{n}) T}{2}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{(1 - 4 ϑ_{n}) T}{4})], \end{matrix}

(9)

for all

λ_{1}, λ_{3}, λ_{5} \in G .

Proof.

Letting

λ_{4} = λ_{6} = 0

and

λ_{2} = λ_{1}

in (8), we get

\begin{matrix} N (χ (2 λ_{1}, λ_{3}, λ_{5}) - 2 χ (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, λ_{1}, λ_{3}, 0, λ_{5}, 0, T), \dots, E_{n} (λ_{1}, λ_{1}, λ_{3}, 0, λ_{5}, 0, T)], \end{matrix}

and so

\begin{matrix} N (χ (2 λ_{1}, λ_{3}, 2 λ_{5}) - 2 χ (λ_{1}, λ_{3}, 2 λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, T), \dots, E_{n} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, T)], \end{matrix}

for all

λ_{1}, λ_{3}, λ_{5} \in G .

Letting

λ_{2} = λ_{4} = 0

and

λ_{6} = λ_{5}

in (8), we get

\begin{matrix} N (χ (λ_{1}, λ_{3}, 2 λ_{5}) - 2 χ (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, T), \dots, E_{n} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, T)], \end{matrix}

and so

\begin{matrix} N (χ (2 λ_{1}, λ_{3}, 2 λ_{5}) - 4 χ (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, T) ⨂_{TN} E_{1} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, \frac{T}{2}), \dots, \\ E_{n} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, T) ⨂_{TN} E_{n} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, \frac{T}{2})] \end{matrix}

(10)

for all

λ_{1}, λ_{3}, λ_{5} \in G .

Letting

λ_{2} = λ_{6} = 0

and

λ_{4} = λ_{3}

in (8), we get

\begin{matrix} N (χ (λ_{1}, 2 λ_{3}, λ_{5}) - 2 χ (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, λ_{3}, λ_{3}, λ_{5}, 0, T), \dots, E_{n} (λ_{1}, 0, λ_{3}, λ_{3}, λ_{5}, 0, T)], \end{matrix}

and so

\begin{matrix} N (χ (2 λ_{1}, 2 λ_{3}, 2 λ_{5}) - 2 χ (2 λ_{1}, λ_{3}, 2 λ_{5}), T) \\ ⪰ Diagonal [E_{1} (2 λ_{1}, 0, λ_{3}, λ_{3}, 2 λ_{5}, 0, T), \dots, E_{n} (2 λ_{1}, 0, λ_{3}, λ_{3}, 2 λ_{5}, 0, T)], \end{matrix}

(11)

for all

λ_{1}, λ_{3}, λ_{5} \in G .

According to (10) and (11)

\begin{matrix} N (χ (2 λ_{1}, 2 λ_{3}, 2 λ_{5}) - 8 χ (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (2 λ_{1}, 0, λ_{3}, λ_{3}, 2 λ_{5}, 0, T) \\ ⨂_{TN} E_{1} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, \frac{T}{2}) \\ ⨂_{TN} E_{1} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, \frac{T}{4}), \dots, \\ E_{n} (2 λ_{1}, 0, λ_{3}, λ_{3}, 2 λ_{5}, 0, T) \\ ⨂_{TN} E_{n} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, \frac{T}{2}) \\ ⨂_{TN} E_{n} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, \frac{T}{4})], \end{matrix}

(12)

and so

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - 8 χ (\frac{λ_{1}}{2}, \frac{λ_{3}}{2}, \frac{λ_{5}}{2}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{2}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{4}), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{2}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{4})], \end{matrix}

(13)

for all

λ_{1}, λ_{3}, λ_{5} \in G .

Consider the set

η : = {Ξ : G^{3} \to P, Ξ (λ_{1}, 0, λ_{5}) = Ξ (0, λ_{3}, λ_{5}) = Ξ (λ_{1}, λ_{3}, 0) = 0}

and the following vector valued generalized metric

ℏ : η \times η ⟶ {[0, + \infty]}^{3 n}

given by

\begin{matrix} ℏ (Ξ, ς) & = & (ℏ_{1} (Ξ, ς), ℏ_{2} (Ξ, ς), ℏ_{3} (Ξ, ς)) \\ = & inf {{(μ_{1}, μ_{2}, μ_{3})}^{n} \in R_{+}^{3 n} : N (Ξ (λ_{1}, λ_{3}, λ_{5}) - ς (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪯ E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{μ_{1}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{μ_{2}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{μ_{3}}), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{μ_{1}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{μ_{2}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{μ_{3}}), \\ \forall λ_{1}, λ_{3}, λ_{5} \in G,}, \end{matrix}

(14)

where, as usual,

inf \emptyset = (inf \emptyset, inf \emptyset, inf \emptyset) = (+ \infty, + \infty, + \infty)

. We prove that

(η, ℏ)

is a complete generalized metric space. We first prove the inequality

ℏ (Ξ, ς) ⪯ ℏ (Ξ, ⊻) + ℏ (⊻, ς)

, as follows:

\begin{matrix} ℏ (Ξ, ς) & = & (ℏ_{1} (Ξ, ς), ℏ_{2} (Ξ, ς), ℏ_{3} (Ξ, ς)) \\ = & inf {{(μ_{1}, μ_{2}, μ_{3})}^{n} \in R_{+}^{3 n} : N (Ξ (λ_{1}, λ_{3}, λ_{5}) - ς (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{μ_{1}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{μ_{2}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{μ_{3}}), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{μ_{1}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{μ_{2}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{μ_{3}})], \forall λ_{1}, λ_{3}, λ_{5} \in G} \\ ⪯ inf {{(μ_{1}, μ_{2}, μ_{3})}^{n} \in R_{+}^{3 n} : N (Ξ (λ_{1}, λ_{3}, λ_{5}) - ⊻ (λ_{1}, λ_{3}, λ_{5}), T) \\ ⨂_{TN} N (⊻ (λ_{1}, λ_{3}, λ_{5}) - ς (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{μ_{1}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{μ_{2}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{μ_{3}}), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{μ_{1}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{μ_{2}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{μ_{3}})], \forall λ_{1}, λ_{3}, λ_{5} \in G} \\ ⪯ inf {{(μ_{1}, μ_{2}, μ_{3})}^{n} \in R_{+}^{3 n} : N (Ξ (λ_{1}, λ_{3}, λ_{5}) - ⊻ (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{μ_{1}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{μ_{2}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{μ_{3}}), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{μ_{1}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{μ_{2}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{μ_{3}}), \forall λ_{1}, λ_{3}, λ_{5} \in G}, \\ + inf {{(μ_{1}, μ_{2}, μ_{3})}^{n} \in R_{+}^{3 n} : N (⊻ (λ_{1}, λ_{3}, λ_{5}) - ς (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{μ_{1}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{μ_{2}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{μ_{3}}), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{μ_{1}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{μ_{2}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{μ_{3}}), \forall λ_{1}, λ_{3}, λ_{5} \in G} \\ = & ℏ (Ξ, ⊻) + ℏ (⊻, ς) . \end{matrix}

(15)

We now prove

(η, ℏ)

is complete. Let

ω_{w}

be a Cauchy sequence in

(η, ℏ)

. Thus, for every

ϵ_{1}, ϵ_{2}, ϵ_{3} > 0,

there exists an

ℵ_{ϵ_{1}, ϵ_{2}, ϵ_{3}} \in N

such that

ℏ (ω_{m}, ω_{w}) ⪯ {(ϵ_{1}, ϵ_{2}, ϵ_{3})}^{n}

for every

m, w \geq ℵ_{ϵ_{1}, ϵ_{2}, ϵ_{3}}

. According to (14), we have

\begin{matrix} N (ω_{m} (λ_{1}, λ_{3}, λ_{5}) - ω_{w} (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{ϵ_{1}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{ϵ_{2}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{ϵ_{3}}), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{ϵ_{1}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{ϵ_{2}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{ϵ_{3}})], \end{matrix}

(16)

for all

λ_{1}, λ_{3}, λ_{5} \in G

. If

λ_{1}, λ_{3}, λ_{5}

are fixed, (16) implies that

{ω_{w} (λ_{1}, λ_{3}, λ_{5})}

is a Cauchy sequence in

G

. Since

G

is complete,

{ω_{w} (λ_{1}, λ_{3}, λ_{5})}

converges for any

λ_{1}, λ_{3}, λ_{5} \in G

. Thus, we can obtain a function

ω

by

ω (λ_{1}, λ_{2}, λ_{3}) : = lim_{w \to \infty} ω_{w} (λ_{1}, λ_{3}, λ_{5}), (λ_{1}, λ_{3}, λ_{5} \in G) .

(17)

It is straightforward to show

ω \in η

. If we let

m \to \infty

we conclude from (16) that

\begin{matrix} N (ω (λ_{1}, λ_{3}, λ_{5}) - ω_{w} (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{ϵ_{1}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{ϵ_{2}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{ϵ_{3}}), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{ϵ_{1}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{ϵ_{2}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{ϵ_{3}})] . \end{matrix}

(18)

Considering (14), we get

ℏ (ω, ω_{w}) ⪯ {(ϵ_{1}, ϵ_{2}, ϵ_{3})}^{n} .

Therefore, the Cauchy sequence

{ω_{w}}

is convergent to

ω

in

(η, ℏ)

. Hence,

(η, ℏ)

is complete.

We now consider the linear mapping

Γ : η \to η

as follows:

Γ (Ξ (λ_{1}, λ_{3}, λ_{5})) : = 8 Ξ (\frac{λ_{1}}{2}, \frac{λ_{3}}{2}, \frac{λ_{5}}{2})

for all

λ_{1}, λ_{3}, λ_{5} \in G .

Let

Ξ, ς \in η

be given such that

ℏ (Ξ, ς) = {(ε_{1}, ε_{2}, ε_{3})}^{n}

. Then, we get

\begin{matrix} N (Ξ (λ_{1}, λ_{3}, λ_{5}) - ς (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{ϵ_{1}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{ϵ_{2}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{ϵ_{3}}), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{ϵ_{1}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{ϵ_{2}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{ϵ_{3}})], \end{matrix}

for all

λ_{1}, λ_{3}, λ_{5} \in G .

Thus, we have that

\begin{matrix} N (Γ (Ξ (λ_{1}, λ_{3}, λ_{5})) - Γ (ς (λ_{1}, λ_{3}, λ_{5})), T) \\ = & N (8 Ξ (\frac{λ_{1}}{2}, \frac{λ_{3}}{2}, \frac{λ_{5}}{2}) - 8 ς (\frac{λ_{1}}{2}, \frac{λ_{3}}{2}, \frac{λ_{5}}{2}), T) \\ ⪰ & Diagonal [E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{4}, \frac{λ_{3}}{4}, \frac{λ_{5}}{2}, 0, \frac{1}{8 ε_{1}} T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{4}, \frac{λ_{1}}{4}, \frac{λ_{3}}{4}, 0, \frac{λ_{5}}{2}, 0, \frac{1}{8 ε_{2}} T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{4}, 0, \frac{λ_{3}}{4}, 0, \frac{λ_{5}}{4}, \frac{λ_{5}}{4}, \frac{1}{8 ε_{3}} T), \dots, \\ E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{4}, \frac{λ_{3}}{4}, \frac{λ_{5}}{2}, 0, \frac{1}{8 ε_{1}} T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{4}, \frac{λ_{1}}{4}, \frac{λ_{3}}{4}, 0, \frac{λ_{5}}{2}, 0, \frac{1}{8 ε_{2}} T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{4}, 0, \frac{λ_{3}}{4}, 0, \frac{λ_{5}}{4}, \frac{λ_{5}}{4}, \frac{1}{8 ε_{3}} T)] \\ ⪰ & Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{1}{4 ϑ_{1} ε_{1}} T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{1}{4 ϑ_{1} ε_{2}} T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{1}{4 ϑ_{1} ε_{3}} T), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{1}{4 ϑ_{n} ε_{1}} T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{1}{4 ϑ_{n} ε_{2}} T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{1}{4 ϑ_{n} ε_{3}} T)], \end{matrix}

(19)

for all

λ_{1}, λ_{3}, λ_{5} \in G .

So we have that

ℏ (Γ Ξ, Γ ς) ⪯ (4 ϑ_{1} (ε_{1}, ε_{2}, ε_{3}), \dots, 4 ϑ_{n} (ε_{1}, ε_{2}, ε_{3}))

. This means that

ℏ (Γ Ξ, Γ ς) ⪯ (4 ϑ_{1}, \dots, 4 ϑ_{n}) ℏ (Ξ, ς),

for all

Ξ, ς \in η

.

It follows from (13) that

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - 8 χ (\frac{λ_{1}}{2}, \frac{λ_{3}}{2}, \frac{λ_{5}}{2}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, 2 T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, 4 T), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, 2 T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, 4 T)], \end{matrix}

(20)

for all

λ_{1}, λ_{3}, λ_{5} \in G

and

χ \in η

. So

ℏ (χ, Γ χ) ⪯ {(1, 2, 4)}^{n}

.

Based on Theorem 1, we can obtain a mapping

χ^{'} : G^{3} \to P

s.t.

(1): $χ^{'}$ is a fixed point of $Γ$ , i.e.,

$\begin{matrix} Γ (χ^{'} (λ_{1}, λ_{3}, λ_{5})) = χ^{'} (λ_{1}, λ_{3}, λ_{5}) : = 8 χ (\frac{λ_{1}}{2}, \frac{λ_{3}}{2}, \frac{λ_{5}}{2}) \end{matrix}$

(21)

for all $λ_{1}, λ_{3}, λ_{5} \in G$ . The mapping $χ^{'}$ is a unique fixed point of $Γ$ . We conclude that $χ^{'}$ is a unique mapping satisfying (21) s.t. there exists ${(μ_{1}, μ_{2}, μ_{3})}^{n} \in {(0, \infty)}^{3 n}$ satisfying

$\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - χ^{'} (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ & Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{μ_{1}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{μ_{2}}) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{μ_{3}}), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, \frac{T}{μ_{1}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{T}{μ_{2}}) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{T}{μ_{3}})], \end{matrix}$

for all $λ_{1}, λ_{3}, λ_{5} \in G$ ;
(2): $ℏ (Γ^{k} L, L^{'}) \to {(0, 0, 0)}^{n}$ as $k \to \infty$ . This implies the following equality

$\begin{matrix} χ^{'} (λ_{1}, λ_{3}, λ_{5}) = lim_{k \to \infty} 8^{k} χ (\frac{λ_{1}}{2^{k}}, \frac{λ_{3}}{2^{k}}, \frac{λ_{5}}{2^{k}}) \end{matrix}$

for all $λ_{1}, λ_{3}, λ_{5} \in G$ ;
(3): $ℏ (χ, χ^{'}) ⪯ (\frac{1}{1 - 4 ϑ_{1}}, \dots, \frac{1}{1 - 4 ϑ_{n}}) ℏ (χ, Γ χ)$ , which implies that

$\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - χ^{'} (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, (1 - 4 ϑ_{1}) T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{1 - 4 ϑ_{1}}{2} T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{1 - 4 ϑ_{1}}{4} T), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, (1 - 4 ϑ_{n}) T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{1 - 4 ϑ_{n}}{2} T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{1 - 4 ϑ_{n}}{4} T)], \end{matrix}$

for all $λ_{1}, λ_{3}, λ_{5} \in G$ .

Now, let

χ^{″} : G^{3} \to P

be another additive mapping satisfying (9). Thus, we get

\begin{matrix} N (χ^{″} (λ_{1}, λ_{3}, λ_{5}) - χ^{'} (λ_{1}, λ_{3}, λ_{5}, T) \\ = N (8^{q} χ^{″} (\frac{λ_{1}}{2^{q}}, \frac{λ_{3}}{2^{q}}, \frac{λ_{5}}{2^{q}}) - 8^{q} χ^{'} (\frac{λ_{1}}{2^{q}}, \frac{λ_{3}}{2^{q}}, \frac{λ_{5}}{2^{q}}), T) \\ ⪰ N (8^{q} χ^{″} (\frac{λ_{1}}{2^{q}}, \frac{λ_{3}}{2^{q}}, \frac{λ_{5}}{2^{q}}) - 8^{q} χ (\frac{λ_{1}}{2^{q}}, \frac{λ_{3}}{2^{q}}, \frac{λ_{5}}{2^{q}}), T) \\ ⨂_{GTN} N (8^{q} χ^{'} (\frac{λ_{1}}{2^{q}}, \frac{λ_{3}}{2^{q}}, \frac{λ_{5}}{2^{q}}) - 8^{q} χ (\frac{λ_{1}}{2^{q}}, \frac{λ_{3}}{2^{q}}, \frac{λ_{5}}{2^{q}}), T) \\ ⪰ Diagonal [E_{1} (\frac{λ_{1}}{2^{q}}, 0, \frac{λ_{3}}{2^{q + 1}}, \frac{λ_{3}}{2^{q + 1}}, \frac{λ_{5}}{2^{q}}, 0, \frac{1 - 4 ϑ}{2 . 8^{q}} T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2^{q + 1}}, \frac{λ_{1}}{2^{q + 1}}, \frac{λ_{3}}{2^{q + 1}}, 0, \frac{λ_{5}}{2^{q}}, 0, \frac{1 - 4 ϑ}{4 . 8^{q}} T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2^{q + 1}}, 0, \frac{λ_{3}}{2^{q + 1}}, 0, \frac{λ_{5}}{2^{q + 1}}, \frac{λ_{5}}{2^{q + 1}}, \frac{1 - 4 ϑ}{8 . 8^{q}} T), \dots, \\ E_{n} (\frac{λ_{1}}{2^{q}}, 0, \frac{λ_{3}}{2^{q + 1}}, \frac{λ_{3}}{2^{q + 1}}, \frac{λ_{5}}{2^{q}}, 0, \frac{1 - 4 ϑ}{2 . 8^{q}} T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2^{q + 1}}, \frac{λ_{1}}{2^{q + 1}}, \frac{λ_{3}}{2^{q + 1}}, 0, \frac{λ_{5}}{2^{q}}, 0, \frac{1 - 4 ϑ}{4 . 8^{q}} T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2^{q + 1}}, 0, \frac{λ_{3}}{2^{q + 1}}, 0, \frac{λ_{5}}{2^{q + 1}}, \frac{λ_{5}}{2^{q + 1}}, \frac{1 - 4 ϑ}{8 . 8^{q}} T)], \end{matrix}

which tends to

1

as

q \to \infty

, for all

λ_{1}, λ_{3}, λ_{5} \in G

. Hence, we can infer

χ^{″} (λ_{1}, λ_{3}, λ_{5}) = χ^{'} (λ_{1}, λ_{3}, λ_{5})

for all

λ_{1}, λ_{3}, λ_{5} \in G

. This shows the uniqueness of

χ^{'}

.

Making use of (8), we get

\begin{matrix} N (χ^{'} (λ_{1} + λ_{2}, λ_{3} - λ_{4}, λ_{5} + λ_{6}) + χ^{'} (λ_{1} - λ_{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}), \\ - 2 χ^{'} (λ_{1}, λ_{3}, λ_{5}) + 2 χ^{'} (λ_{1}, λ_{4}, λ_{6}) - 2 χ^{'} (λ_{2}, λ_{3}, λ_{6}) + 2 χ^{'} (λ_{2}, λ_{4}, λ_{5}), T) \\ = lim_{n \to \infty} N (8^{n} [χ (\frac{λ_{1} + λ_{2}}{2^{n}}, \frac{λ_{3} - λ_{4}}{2^{n}}, \frac{λ_{5} + λ_{6}}{2^{n}}) + χ (\frac{λ_{1} - λ_{2}}{2^{n}}, \frac{λ_{3} + λ_{4}}{2^{n}}, \frac{λ_{5} - λ_{6}}{2^{n}}) \\ - 2 χ (\frac{λ_{1}}{2^{n}}, \frac{λ_{3}}{2^{n}}, \frac{λ_{5}}{2^{n}}) + 2 χ (\frac{λ_{1}}{2^{n}}, \frac{λ_{4}}{2^{n}}, \frac{λ_{6}}{2^{n}}) \\ - 2 χ (\frac{λ_{2}}{2^{n}}, \frac{λ_{3}}{2^{n}}, \frac{λ_{6}}{2^{n}}) + 2 χ (\frac{λ_{2}}{2^{n}}, \frac{λ_{4}}{2^{n}}, \frac{λ_{5}}{2^{n}})], T) \\ ⪰ lim_{n \to \infty} N (8^{n} λ [2 χ (\frac{λ_{1} + λ_{2}}{2^{n + 1}}, \frac{λ_{3} - λ_{4}}{2^{n}}, \frac{λ_{5} + λ_{6}}{2^{n}}) + 2 χ (\frac{λ_{1} - λ_{2}}{2^{n + 1}}, \frac{λ_{3} + λ_{4}}{2^{n}}, \frac{λ_{5} - λ_{6}}{2^{n}}) \\ - 2 χ (\frac{λ_{1}}{2^{n}}, \frac{λ_{3}}{2^{n}}, \frac{λ_{5}}{2^{n}}) + 2 χ (\frac{λ_{1}}{2^{n}}, \frac{λ_{4}}{2^{n}}, \frac{λ_{6}}{2^{n}}) \\ - 2 χ (\frac{λ_{2}}{2^{n}}, \frac{λ_{3}}{2^{n}}, \frac{λ_{6}}{2^{n}}) + 2 χ (\frac{λ_{2}}{2^{n}}, \frac{λ_{4}}{2^{n}}, \frac{λ_{5}}{2^{n}})], T) \\ ⨂_{GTN} Diagonal [lim_{n \to \infty} E_{1} (\frac{λ_{1}}{2^{n}}, \frac{λ_{2}}{2^{n}}, \frac{λ_{3}}{2^{n}}, \frac{λ_{4}}{2^{n}}, \frac{λ_{5}}{2^{n}}, \frac{λ_{6}}{2^{n}}, \frac{T}{8^{n}}), \dots, \\ lim_{n \to \infty} E_{n} (\frac{λ_{1}}{2^{n}}, \frac{λ_{2}}{2^{n}}, \frac{λ_{3}}{2^{n}}, \frac{λ_{4}}{2^{n}}, \frac{λ_{5}}{2^{n}}, \frac{λ_{6}}{2^{n}}, \frac{T}{8^{n}})] \\ ⪰ N (λ [2 χ^{'} (\frac{λ_{1} + λ_{2}}{2}, λ_{3} - λ_{4}, λ_{5} + λ_{6}) + 2 χ^{'} (\frac{λ_{1} - λ_{2}}{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}) \\ - 2 χ^{'} (λ_{1}, λ_{3}, λ_{5}) + 2 χ^{'} (λ_{1}, λ_{4}, λ_{6}) \\ - 2 χ^{'} (λ_{2}, λ_{3}, λ_{6}) + 2 χ^{'} (λ_{2}, λ_{4}, λ_{5})], T) \end{matrix}

for all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in G .

So, we have

\begin{matrix} N (χ^{'} (λ_{1} + λ_{2}, λ_{3} - λ_{4}, λ_{5} + λ_{6}) + χ^{'} (λ_{1} - λ_{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}) \\ - 2 χ^{'} (λ_{1}, λ_{3}, λ_{5}) + 2 χ^{'} (λ_{1}, λ_{4}, λ_{6}) \\ - 2 χ^{'} (λ_{2}, λ_{3}, λ_{6}) + 2 χ^{'} (λ_{2}, λ_{4}, λ_{5}), T) \\ ⪰ N (λ [2 χ^{'} (\frac{λ_{1} + λ_{2}}{2}, λ_{3} - λ_{4}, λ_{5} + λ_{6}) + 2 χ^{'} (\frac{λ_{1} - λ_{2}}{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}) \\ - 2 χ^{'} (λ_{1}, λ_{3}, λ_{5}) + 2 χ^{'} (λ_{1}, λ_{4}, λ_{6}) \\ - 2 χ^{'} (λ_{2}, λ_{3}, λ_{6}) + 2 χ^{'} (λ_{2}, λ_{4}, λ_{5})], T) \end{matrix}

for all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in G

. Using Lemma 1, we infer the mapping

χ^{'} : G^{3} \to P

is tri-additive. □

Theorem 3.

Suppose

i = 1, \dots, n

and

n \in N .

Let

E_{i} : G^{6} \times (0, + \infty) \to Φ

be a function such that

\begin{matrix} E_{i} (2 λ_{1}, 2 λ_{2}, 2 λ_{3}, 2 λ_{4}, 2 λ_{5}, 2 λ_{6}, T) ⪰ E_{i} (λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6}, \frac{T}{2 ϑ_{i}}), \end{matrix}

(22)

for all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in G

and

0 < ϑ_{i} < 1

. Let

χ : G^{3} \to P

be a mapping satisfying (8) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

for all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in G

. Then, we can find a unique tri-additive mapping

χ^{'} : G^{3} \to P

satisfying

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - χ^{'} (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, λ_{3}, λ_{3}, 2 λ_{5}, 0, (8 - 2 ϑ_{1}) T) \\ ⨂_{TN} E_{1} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, (4 - ϑ_{1}) T) \\ ⨂_{TN} E_{1} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, \frac{4 - ϑ_{1}}{2} T), \dots, \\ E_{n} (λ_{1}, 0, λ_{3}, λ_{3}, 2 λ_{5}, 0, (8 - 2 ϑ_{n}) T) \\ ⨂_{TN} E_{n} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, (4 - ϑ_{n}) T) \\ ⨂_{TN} E_{n} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, \frac{4 - ϑ_{n}}{2} T)], \end{matrix}

for all

λ_{1}, λ_{3}, λ_{5} \in G

.

Proof.

According to (12) we have

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - \frac{1}{8} χ (2 λ_{1}, 2 λ_{3}, 2 λ_{5}), T) \\ ⪰ Diagonal [E_{1} (2 λ_{1}, 0, λ_{3}, λ_{3}, 2 λ_{5}, 0, 8 T) \\ ⨂_{TN} E_{1} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, 4 T) \\ ⨂_{TN} E_{1} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, 2 T), \dots, \\ E_{n} (2 λ_{1}, 0, λ_{3}, λ_{3}, 2 λ_{5}, 0, 8 T) \\ ⨂_{TN} E_{n} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, 4 T) \\ ⨂_{TN} E_{n} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, 2 T)], \end{matrix}

for all

λ_{1}, λ_{3}, λ_{5} \in G

.

By using a similar method as in the proof of Theorem 2, the proof will be completed. □

3. Permuting Tri-Derivations on MFB-Algebras

Here, we study the multi-stability of permuting triderivations on unital MFC-⋄-algebras and complex MFB-algebras related to the functional Equation (1).

Lemma 2

([47]). Let

χ : G^{2} \to P

be a bi-additive mapping s.t.

χ (Λ_{1} λ_{1}, Λ_{2} λ_{3}) = Λ_{1} Λ_{2} χ (λ_{1}, λ_{3})

for all

λ_{1}, λ_{3} \in J

and

Λ_{1}, Λ_{2} \in Δ^{1} : = {∁ \in C : | ∁ | = 1}

. Then, χ is

C -

bilinear.

Lemma 3.

Consider the tri-additive mapping

χ : G^{3} \to P

s.t.

χ (Λ_{1} λ_{1}, Λ_{2} λ_{3}, Λ_{3} λ_{5}) = Λ_{1} Λ_{2} Λ_{3} χ (λ_{1}, λ_{3}, λ_{5})

for all

λ_{1}, λ_{3}, λ_{5} \in ℧_{1}

and

Λ_{1}, Λ_{2}, Λ_{3} \in Δ^{1}

. Then, χ is

C -

trilinear.

Proof.

It follows from a similar method as in the proof of Theorem [47] (Lemma 2.1). □

Theorem 4.

Suppose

i = 1, \dots, n

and

n \in N .

Let

E_{i} : ν^{6} \times (0, + \infty) \to Φ

be a function such that there exists a

0 < ϑ_{i} < 1

with

\begin{matrix} E_{i} (\frac{λ_{1}}{2}, \frac{λ_{2}}{2}, \frac{λ_{3}}{2}, \frac{λ_{4}}{2}, \frac{λ_{5}}{2}, \frac{λ_{6}}{2}, T) ⪰ E_{i} (λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6}, \frac{2}{ϑ} T) \end{matrix}

(23)

and let

χ : ν^{3} \to ν

be a mapping satisfying

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

and

\begin{matrix} N (χ (Λ_{1} (λ_{1} + λ_{2}), Λ_{2} (λ_{3} - λ_{4}), Λ_{3} (λ_{5} + λ_{6})) \\ + χ (Λ_{1} (λ_{1} - λ_{2}), Λ_{2} (λ_{3} + λ_{4}), Λ_{3} (λ_{5} - λ_{6})) \\ - Λ_{1} Λ_{2} Λ_{3} (2 χ (λ_{1}, λ_{3}, λ_{5}) - 2 χ (λ_{1}, λ_{4}, λ_{6}) \\ + 2 χ (λ_{2}, λ_{3}, λ_{6}) - 2 χ (λ_{2}, λ_{4}, λ_{5})), T) \\ ⪰ N (λ [2 χ (\frac{λ_{1} + λ_{2}}{2}, λ_{3} - λ_{4}, λ_{5} + λ_{6}) + 2 χ (\frac{λ_{1} - λ_{2}}{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}) \\ - 2 χ (λ_{1}, λ_{3}, λ_{5}) + 2 χ (λ_{1}, λ_{4}, λ_{6}) \\ - 2 χ (λ_{2}, λ_{3}, λ_{6}) + 2 χ (λ_{2}, λ_{4}, λ_{5}))], T) \\ ⨂_{GTN} Diagonal [E_{1} (λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6}, T), \dots, E_{n} (λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6}, T)], \end{matrix}

(24)

for all

Λ_{1}, Λ_{2}, Λ_{3} \in Δ^{1}

and all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in ν

. Then, we obtain a unique

C -

trilinear mapping

ϖ : ν^{3} \to ν

satisfying

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - ϖ (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, (1 - 4 ϑ_{1}) T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{(1 - 4 ϑ_{1})}{2} T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{(1 - 4 ϑ_{1})}{4} T), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, (1 - 4 ϑ_{n}) T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{(1 - 4 ϑ_{n})}{2} T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{(1 - 4 ϑ_{n})}{4} T)], \end{matrix}

(25)

for any

λ_{1}, λ_{3}, λ_{5} \in ν

.

Besides, if the mapping

χ : ν^{3} \to ν

satisfies

χ (λ_{1}, λ_{3}, λ_{5}) = 2 χ (λ_{1}, λ_{3}, λ_{5})

and

\begin{matrix} N (χ (λ_{1} λ_{2}, λ_{3}, λ_{5}) - χ (λ_{1}, λ_{3}, λ_{5}) λ_{2} - λ_{1} χ (λ_{2}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, λ_{2}, λ_{3}, λ_{3}, λ_{5}, λ_{5}, T), \dots, E_{n} (λ_{1}, λ_{2}, λ_{3}, λ_{3}, λ_{5}, λ_{5}, T)], \end{matrix}

(26)

\begin{matrix} N (χ (ℓ_{β (1)}, ℓ_{β (2)}, ℓ_{β (3)}) - χ (ℓ_{1}, ℓ_{2}, ℓ_{3}), T) \\ ⪰ E (ℓ_{1}, ℓ_{1}, ℓ_{2}, ℓ_{2}, ℓ_{3}, ℓ_{3}, T) \end{matrix}

(27)

for all permutations

(β (1), β (2), β (3))

of

(1, 2, 3)

, and for all

λ_{1}, λ_{2}, λ_{3}, ℓ_{1}, ℓ_{2}, ℓ_{3}, λ_{5} \in ν

, then, the

C -

trilinear mapping

ϖ : ν^{3} \to ν

is a permuting tri-derivation.

Proof.

Suppose

Λ_{1} = Λ_{2} = Λ_{3} = 1

in (24). Theorem 2 and [48] (Theorem 3.3) establish the theorem. □

Theorem 5.

Suppose

i = 1, \dots, n

and

n \in N .

Let

E_{i} : ν^{6} \times (0, + \infty) \to Φ

be a function such that there exists an

0 < ϑ_{i} < 1

with

\begin{matrix} E_{i} (2 λ_{1}, 2 λ_{2}, 2 λ_{3}, 2 λ_{4}, 2 λ_{5}, 2 λ_{6}, T) ≻ E (λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6}, \frac{T}{2 ϑ_{i}}), \end{matrix}

(28)

for all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in ν

. Let

χ : ν^{3} \to ν

be a mapping satisfying (24) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

for all

λ_{1}, λ_{3}, λ_{5} \in ν

. Then, we obtain a unique

C -

trilinear mapping

ϖ : ν^{3} \to ν

satisfying

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - ϖ (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (2 λ_{1}, 0, λ_{3}, λ_{3}, 2 λ_{5}, 0, 2 (4 - ϑ_{1}) T) \\ ⨂ E_{1} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, (4 - ϑ_{1}) T) \\ ⨂ E_{1} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, \frac{(4 - ϑ_{1})}{2} T), \dots, \\ E_{n} (2 λ_{1}, 0, λ_{3}, λ_{3}, 2 λ_{5}, 0, 2 (4 - ϑ_{n}) T) \\ ⨂ E_{n} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, (4 - ϑ_{n}) T) \\ ⨂ E_{n} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, \frac{(4 - ϑ_{n})}{2} T)], \end{matrix}

(29)

for all

λ_{1}, λ_{3}, λ_{5} \in ν

.

Also, if the mapping

χ : ν^{3} \to ν,

satisfies (26), (27) and

χ (2 λ_{1}, λ_{3}, λ_{5}) = 2 χ (λ_{1}, λ_{3}, λ_{5})

for all

λ_{1}, λ_{3}, λ_{5} \in ν

, then the

C -

trilinear mapping

ϖ : ν^{3} \to ν

is a permuting tri-derivation.

Proof.

This follows from an analogous technique as in the proof of Theorem 4. □

Now, let

ν

and

U (ν)

be a unital MFC-

⋄ -

algebra with unit e and unitary group, respectively.

Theorem 6.

Suppose

i = 1, \dots, n

and

n \in N .

Consider a function

E_{i} : ν^{6} \times (0, + \infty) \to Φ

which satisfies (23) and a mapping

χ : ν^{3} \to ν

which satisfies (24) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

, for all

λ_{1}, λ_{3}, λ_{5} \in ν

. Then, we obtain a unique

C -

trilinear mapping

ϖ : ν^{3} \to ν

which satisfies (25).

Also, if the mapping

χ : ν^{3} \to ν

satisfies (27),

χ (2 ϕ, λ_{3}, λ_{5}) = 2 χ (ϕ, λ_{3}, λ_{5})

and

\begin{matrix} N (χ (ϕ λ_{2}, λ_{3}, λ_{5}) - χ (ϕ, λ_{3}, λ_{5}) λ_{2} - ϕ χ (λ_{2}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (ϕ, λ_{2}, λ_{3}, λ_{3}, λ_{5}, λ_{5}), \dots, E_{n} (ϕ, λ_{2}, λ_{3}, λ_{3}, λ_{5}, λ_{5})], \end{matrix}

(30)

for all

λ_{2}, λ_{3}, λ_{5} \in ν

and every

ϕ \in U (ν)

, then, the

C -

trilinear mapping

ϖ : ν^{3} \to ν,

is a permuting tri-derivation.

Proof.

Theorem 4 and [48] (Theorem 3.7) establish the theorem. □

Remark 1.

By a similar method as in the proof of the last theorem, we can conclude that if (30) in Theorem 6 is replaced by

\begin{matrix} N (χ (ϕ φ, φ_{1}, φ_{2}) - χ (ϕ, φ_{1}, φ_{2}) φ - ϕ χ (φ, φ_{1}, φ_{2}), T) \\ ⪰ Diagonal [E_{1} (ϕ, φ, φ_{1}, φ_{1}, φ_{2}, φ_{2}, T), \dots, E_{n} (ϕ, φ, φ_{1}, φ_{1}, φ_{2}, φ_{2}, T)], \end{matrix}

for all

ϕ, φ, φ_{1}, φ_{2} \in U (ν)

, then, the

C -

trilinear mapping

ϖ : ν^{3} \to ν

is a permuting triderivation.

Theorem 7.

Suppose

i = 1, \dots, n

and

n \in N .

Let

E_{i} : ν^{6} \times (0, + \infty) \to Φ

be a function satisfying (28) and

χ : ν^{3} \to ν

be a mapping satisfying (24) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

, for all

λ_{1}, λ_{3}, λ_{5} \in ν

. Then, we can find a unique

C -

trilinear mapping

ϖ : ν^{3} \to ν

satisfying (29).

Also, if the mapping

χ : ν^{3} \to ν

satisfies (27) , (30) and

χ (2 ϕ, λ_{3}, λ_{5}) = 2 χ (ϕ, λ_{3}, λ_{5})

for all

λ_{3}, λ_{5} \in ν

and every

ϕ \in U (ν)

, then, the

C -

trilinear mapping

ϖ : ν^{3} \to ν

is a permuting tri-derivation.

Proof.

An analogous technique as in the proof of Theorem 6 proves the result. □

4. Permuting Tri-Homomorphisms in MFC-⋄-Aalgebras

Here, we prove the multi-stability results of permuting tri-homomorphisms in unital MFC-⋄-algebras related to the functional inequality (1).

Theorem 8.

Suppose

i = 1, \dots, n

and

n \in N .

Let

E_{i} : ν^{6} \times (0, + \infty) \to Φ

be a function such that there exists a

0 < ϑ_{i} < 1

with

\begin{matrix} E_{i} (\frac{λ_{1}}{2}, \frac{λ_{2}}{2}, \frac{λ_{3}}{2}, \frac{λ_{4}}{2}, \frac{λ_{5}}{2}, \frac{λ_{6}}{2}, T) ≻ E_{i} (λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6}, \frac{2}{ϑ_{i}} T) \end{matrix}

(31)

and let

χ : ν^{3} \to Θ

be a mapping satisfying (24) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

, for all

λ_{1}, λ_{3}, λ_{4} \in ν

. Then, we obtain a unique

C -

trilinear mapping

ρ : ν^{3} \to Θ

satisfying

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - ρ (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, (1 - 4 ϑ_{1}) T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{(1 - 4 ϑ_{1})}{2} T) \\ ⨂_{TN} E_{1} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{(1 - 4 ϑ_{1})}{4} T), \dots, \\ E_{n} (λ_{1}, 0, \frac{λ_{3}}{2}, \frac{λ_{3}}{2}, λ_{5}, 0, (1 - 4 ϑ_{n}) T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, \frac{λ_{1}}{2}, \frac{λ_{3}}{2}, 0, λ_{5}, 0, \frac{(1 - 4 ϑ_{n})}{2} T) \\ ⨂_{TN} E_{n} (\frac{λ_{1}}{2}, 0, \frac{λ_{3}}{2}, 0, \frac{λ_{5}}{2}, \frac{λ_{5}}{2}, \frac{(1 - 4 ϑ_{n})}{4} T)], \end{matrix}

(32)

for all

λ_{1}, λ_{3}, λ_{5} \in ν

, where

E_{i}

is given in Theorem 2.

Also, if the mapping

χ : ν^{3} \to Θ

satisfies (27) and

\begin{matrix} N (χ (λ_{1} λ_{2}, λ_{3} λ 4, λ_{5} λ_{6}) - χ (λ_{1}, λ_{3}, λ_{5}) χ (λ_{2}, λ_{4}, λ_{6}), T) \\ ⪰ Diagonal [E_{1} (λ_{1}, λ_{2}, λ_{3}, λ_{3}, λ_{5}, λ_{5}, T), \dots, E_{n} (λ_{1}, λ_{2}, λ_{3}, λ_{3}, λ_{5}, λ_{5}, T)], \end{matrix}

(33)

for all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in ν

, then, the

C -

trilinear mapping

ρ : ν^{3} \to Θ

is a permuting tri-homomorphism.

Proof.

Theorem 4 and [48] (Theorem 4.1) establish the theorem. □

Theorem 9.

Suppose

i = 1, \dots, n

and

n \in N .

Let

E_{i} : ν^{6} \times (0, + \infty) \to Φ

be a function which satisfies (28) and

χ : ν^{3} \to Θ

be a mapping which satisfies (24) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

for all

λ_{1}, λ_{3}, λ_{4} \in ν

. Then, we can obtain a unique

C -

trilinear mapping

ρ : ν^{3} \to Θ

satisfying

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - ρ (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [E_{1} (2 λ_{1}, 0, λ_{3}, λ_{3}, 2 λ_{5}, 0, 2 (4 - ϑ_{1}) T) \\ ⨂_{TN} E_{1} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, (4 - ϑ_{1}) T) \\ ⨂_{TN} E_{1} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, \frac{(4 - ϑ_{1})}{2} T), \dots, \\ E_{n} (2 λ_{1}, 0, λ_{3}, λ_{3}, 2 λ_{5}, 0, 2 (4 - ϑ_{n}) T) \\ ⨂_{TN} E_{n} (λ_{1}, λ_{1}, λ_{3}, 0, 2 λ_{5}, 0, (4 - ϑ_{n}) T) \end{matrix}

(34)

\begin{matrix} ⨂_{TN} E_{n} (λ_{1}, 0, λ_{3}, 0, λ_{5}, λ_{5}, \frac{(4 - ϑ_{n})}{2} T)], \end{matrix}

(35)

for all

λ_{1}, λ_{3}, λ_{5} \in ν

.

Also, if the mapping

χ : ν^{3} \to Θ

satisfies (27) and (33) , then, the

C -

trilinear mapping

ρ : ν^{3} \to Θ

is a permuting tri-homomorphism.

Proof.

By using a similar method as in the proof of Theorem 8, we obtain the result. □

Now, let

ν

and

U (ν)

be a unital

C^{*}

MFB-algebra with unit e and unitary group, respectively.

Theorem 10.

Suppose

i = 1, \dots, n

and

n \in N .

Let

E_{i} : ν^{6} \times (0, + \infty) \to Φ

be a function satisfying (31) and

χ : ν^{3} \to Θ

be a mapping satisfying (24) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

for all

λ_{1}, λ_{3}, λ_{5} \in ν

. Then, we can find a unique

C -

trilinear mapping

ρ : ν^{3} \to Θ

satisfying (32).

Also, if

χ : ν^{3} \to Θ

satisfies (27) and

\begin{matrix} N (χ (ϕ_{1} φ_{1}, ϕ_{2} φ_{2}, ϕ_{3} φ_{3}) - χ (ϕ_{1}, ϕ_{2}, ϕ_{3}) χ (φ_{1}, φ_{2}, φ_{3}), T) \\ ⪰ Diagonal [E_{1} (ϕ_{1}, φ_{1}, ϕ_{2}, φ_{2}, ϕ_{3}, φ_{3}, T), \dots, E_{n} (ϕ_{1}, φ_{1}, ϕ_{2}, φ_{2}, ϕ_{3}, φ_{3}, T)], \end{matrix}

(36)

for all

ϕ_{i}, φ_{i} \in U (ν), i = 1, 2, 3

, then, the

C -

trilinear mapping

ρ : ν^{3} \to Θ

is a permuting tri-homomorphism.

Proof.

Theorem 4 and [48] (Theorem 4.5) establish the theorem. □

Theorem 11.

Suppose

i = 1, \dots, n

and

n \in N .

Let

E_{i} : ν^{6} \times (0, + \infty) \to Φ

be a function which satisfies (28) and

χ : ν^{3} \to Θ

be a mapping which satisfies (24) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

, for all

λ_{1}, λ_{3}, λ_{5} \in ν

. Then, we can find a unique

C -

trilinear mapping

ρ : ν^{3} \to Θ

satisfying (34).

Also, if the mapping

χ : ν^{3} \to Θ

satisfies (27) and (36) , then, the

C -

trilinear mapping

ρ : ν^{3} \to Θ

is a permuting tri-homomorphism.

Proof.

By using a similar method as in the proof of Theorem 10, we obtain the result. □

5. Application

First, we present the concept of aggregation functions. Next, we propose a small list of aggregation functions on some special functions to obtain optimal stability and minimal error which enable us to present a unique optimum solution. We refer to [49,50,51,52,53,54,55,56,57] for more applications.

Let

n \in N,

and

[n] : = {1, \dots, n}

. We will use bold symbols to denote

n -

tuples. For example

Diagonal {[y_{1}, \dots, y_{n}]}_{n \times n}

will often be written

Y .

Definition 9

([42]). A function

A^{(n)} : Diagonal {[Φ, \dots, Φ]}_{n \times n} ⟶ Φ

is called an aggregation function if it is nondecreasing in each variable and also fulfills the boundary conditions

\begin{matrix} inf_{Y \in Φ^{n}} A^{(n)} (Y) = inf Φ, and sup_{Y \in Φ^{n}} A^{(n)} (Y) = sup Φ . \end{matrix}

(37)

The

n \in N

displays the arity of the aggregation function or the number of its variables. Note that we will denote the aggregation functions as A instead of

A^{(n)} .

We now give a common list of aggregation functions.

The arithmetic mean function $AM : Diagonal {[Φ, \dots, Φ]}_{n \times n} ⟶ Φ$ and the geometric mean function $GM : Diagonal {[Φ, \dots, Φ]}_{n \times n} ⟶ Φ$ are respectively given by

$\begin{matrix} {AG}_{1} (Y) : = AM (Y) : = \frac{1}{n} \sum_{i = 1}^{n} y_{i}, \end{matrix}$

(38)

$\begin{matrix} {AG}_{2} (Y) : = GM (Y) : = {(\prod_{i = 1}^{n} y_{i})}^{\frac{1}{n}} . \end{matrix}$

(39)
For every $k \in [n],$ the projection function $P_{k} : Diagonal {[Φ, \dots, Φ]}_{n \times n} ⟶ Φ$ and the order statistic function ${OS}_{k} : Diagonal {[Φ, \dots, Φ]}_{n \times n} ⟶ Φ$ associated with the $k^{t h}$ argument, are respectively given by

$\begin{matrix} {AG}_{3} (Y) : = P_{k} (Y) : = y_{k}, \end{matrix}$

(40)

$\begin{matrix} {AG}_{4} (Y) : = {OS}_{k} (Y) : = {(y)}_{k}, \end{matrix}$

(41)

where ${(y)}_{k}$ is the $k^{t h}$ lowest coordinate of y, that is,

$\begin{matrix} y_{(1)} ⩽ \dots ⩽ y_{(k)} ⩽ \dots y_{(n)} . \end{matrix}$

The projections onto the first and the last coordinates are given by

$\begin{matrix} {AG}_{5} (Y) : = P_{F} (Y) : = P_{1} (Y) = y_{1}, \end{matrix}$

(42)

$\begin{matrix} {AG}_{6} (Y) : = P_{L} (Y) : = P_{n} (Y) = y_{n} . \end{matrix}$

(43)

Also, the extreme order statistics $y_{1}$ and $y_{n}$ are the minimum and maximum functions, respectively,

$\begin{matrix} {AG}_{7} (Y) : = MIN (Y) : = {OS}_{1} (Y) = min {y_{1}, \dots, y_{n}}, \end{matrix}$

(44)

$\begin{matrix} {AG}_{8} (Y) : = MAX (Y) : = {OS}_{n} (Y) = max {y_{1}, \dots, y_{n}}, \end{matrix}$

(45)

which will sometimes be written by means of the lattice operations ∨ and ∧, respectively, that is,

$\begin{matrix} MIN (Y) = ⋀_{i = 1}^{n} y_{i}, and MAX (Y) = ⋁_{i = 1}^{n} y_{i} . \end{matrix}$

Note that ${OS}_{k}$ can be shown in terms of only minima and maxima as follows

$\begin{matrix} {OS}_{k} (Y) = \underset{_{∣ K ∣ = k}^{K \subseteq [n]}}{⋀} \underset{i \in K}{⋁} y_{i} = \underset{_{∣ K ∣ = n - k + 1}^{K \subseteq [n]}}{⋁} \underset{i \in K}{⋀} y_{i} . \end{matrix}$

Similarly, the median of an odd number of values $Diagonal {[y_{1}, \dots, y_{2 k - 1}]}_{(2 k - 1) \times (2 k - 1)}$ is given by

$\begin{matrix} MED (Diagonal {[y_{1}, \dots, y_{2 k - 1}]}_{(2 k - 1) \times (2 k - 1)}) = y_{(k)}, \end{matrix}$

that can be shown by

$\begin{matrix} MED (Diagonal {[y_{1}, \dots, y_{2 k - 1}]}_{(2 k - 1) \times (2 k - 1)}) = \underset{_{∣ K ∣ = k}^{K \subseteq [2 k - 1]}}{⋀} \underset{i \in K}{⋁} y_{i} = \underset{_{∣ K ∣ = k}^{K \subseteq [2 k - 1]}}{⋁} \underset{i \in K}{⋀} y_{i} . \end{matrix}$

For instance, we get

$\begin{matrix} MED (Diagonal {[y_{1}, y_{2}, y_{3}]}_{3 \times 3}) & = & (y_{1} \land y_{2}) \lor (y_{1} \land y_{3}) \lor (y_{2} \land y_{3}) \\ = & (y_{1} \lor y_{2}) \land (y_{1} \lor y_{3}) \land (y_{2} \lor y_{3}) . \end{matrix}$

For an even number of values $Diagonal [y_{1}, \dots, y_{2 k}],$ the median is given by

$\begin{matrix} MED (Diagonal {[y_{1}, \dots, y_{2 k}]}_{2 k \times 2 k}) : = AM (Diagonal {[y_{(k)}, y_{(k + 1)}]}_{2 \times 2}) = \frac{y_{(k)} + y_{(k + 1)}}{2} . \end{matrix}$

For every $φ \in Φ,$ we also define the $φ -$ median, ${MED}_{φ} : Diagonal {[Φ, \dots, Φ]}_{n \times n} ⟶ Φ,$ by

$\begin{matrix} {AG}_{9} (Y) : = {MED}_{φ} (Y) & = & MED (Diagonal {[y_{1}, \dots, y_{n}, \underset{n - 1}{\underset{⏟}{φ, \dots, φ}}]}_{(2 n - 1) \times (2 n - 1)}) \\ = & MED (MIN (Y), φ, MAX (Y)) . \end{matrix}$
For every $\emptyset \neq K \subseteq [n],$ the partial minimum ${MIN}_{k} : Diagonal {[Φ, \dots, Φ]}_{n \times n} ⟶ Φ$ and the partial maximum ${MAX}_{k} : Diagonal {[Φ, \dots, Φ]}_{n \times n} ⟶ Φ,$ associated with K, are respectively given by

$\begin{matrix} {AG}_{10} (Y) : = {MIN}_{k} (Y) : = \underset{i \in K}{⋀} y_{i}, \end{matrix}$

(46)

$\begin{matrix} {AG}_{11} (Y) : = {MAX}_{k} (Y) : = \underset{i \in K}{⋁} y_{i} . \end{matrix}$

(47)
For every weight vector $V = Diagonal {[v_{1}, \dots, v_{n}]}_{n \times n} \in Diagonal {[Φ, \dots, Φ]}_{n \times n}$ s.t. $\sum_{i = 1}^{n} v_{i} = 1,$ the weighted arithmetic mean function ${WAM}_{V} : Diagonal {[Φ, \dots, Φ]}_{n \times n}$ $⟶ Φ$ and the ordered weighted averaging function ${OWA}_{V} : Diagonal {[Φ, \dots, Φ]}_{n \times n}$ $⟶ Φ,$ associated with $V$ , are respectively given by

$\begin{matrix} {AG}_{12} (Y) : = {WAM}_{V} (Y) : = \sum_{i = 1}^{n} v_{i} y_{i}, \end{matrix}$

(48)

$\begin{matrix} {AG}_{13} (Y) : = {OWA}_{V} (Y) : = \sum_{i = 1}^{n} v_{i} y_{(i)} . \end{matrix}$

(49)
The sum $\sum : Diagonal {[Φ, \dots, Φ]}_{n \times n} ⟶ Φ$ and product $Π : Diagonal {[Φ, \dots, Φ]}_{n \times n}$ $⟶ Φ$ functions are respectively given by

$\begin{matrix} {AG}_{14} (Y) : = \sum (Y) : = \sum_{i = 1}^{n} y_{i}, \end{matrix}$

(50)

$\begin{matrix} {AG}_{15} (Y) : = Π (Y) : = \prod_{i = 1}^{n} y_{i} . \end{matrix}$

(51)

The main issue we are investigating in this section is that of aggregation which refers to the process of merging and combining various values into a single one. Now, we apply the above aggregation functions on Mittag-Leffler-type functions to present a class of controller to study the multi stability for the governing model.

Assume the following Mittag-Leffler-type functions:

The one parameter Mittag-Leffler function [43]:

$\begin{matrix} E_{1} (Y) : = \nabla_{♭} (Y) = \sum_{i = 0}^{\infty} \frac{Y^{i}}{Γ (i ♭ + 1)}, \end{matrix}$

(52)

where $♭, Y \in C, i \in N,$ and $ℜ (℘) > 0 .$
The pre-superhyperbolic supercosine through (52) [43]:

$\begin{matrix} E_{2} (Y) & : = & p r e c o s h_{♭} (Y) \\ = & 0.5 (\nabla_{♭} (Y) + \nabla_{♭} (- Y)) \\ = & \sum_{i = 0}^{\infty} \frac{Y^{2 i}}{Γ ((2 i) ♭ + 1)}, \end{matrix}$

where $Y, ♭ \in C,$ and $ℜ (♭) > 0 .$
The pre-supercosine function through (52) [43]:

$\begin{matrix} E_{3} (Y) & : = & p r e c o s_{♭} (Y) \\ = & \frac{1}{2} (\nabla_{♭} (i Y) + \nabla_{♭} (- i Y)) \\ = & \sum_{i = 0}^{\infty} \frac{{(- 1)}^{i} Y^{2 i}}{Γ ((2 i) ♭ + 1)}, \end{matrix}$

where $Y, ♭ \in C,$ and $ℜ (♭) > 0 .$
The pre-superhyperbolic supersine through (52) [43]:

$\begin{matrix} E_{4} (Y) & : = & p r e s i n h_{♭} (Y) \\ = & \frac{1}{2} (\nabla_{♭} (Y) - \nabla_{♭} (- Y)) \\ = & \sum_{i = 0}^{\infty} \frac{Y^{2 i + 1}}{Γ ((2 i + 1) ♭ + 1)}, \end{matrix}$

where $Y, ♭ \in C,$ and $ℜ (♭) > 0 .$
The pre-supersine function through (52) [43]:

$\begin{matrix} E_{5} (Y) & : = & p r e s i n_{♭} (Y) \\ = & \frac{1}{2 i} (\nabla_{♭} (i Y) - \nabla_{♭} (- i Y)) \\ = & \sum_{i = 0}^{\infty} \frac{{(- 1)}^{i} Y^{2 i + 1}}{Γ ((2 i + 1) ♭ + 1)}, \end{matrix}$

where $Y, ♭ \in C,$ and $ℜ (♭) > 0 .$

Now, we have the following results, for every

i = 1, \dots, 5 .

Corollary 1.

Let

T \geq 0

,

r_{i} > 3

and

Ψ_{i} > 0

be in

R

and

χ : G^{3} \to P

be a mapping satisfying

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

and

\begin{matrix} N (χ (λ_{1} + λ_{2}, λ_{3} - λ_{4}, λ_{5} + λ_{6}) + χ (λ_{1} - λ_{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}) \\ - 2 χ (λ_{1}, λ_{3}, λ_{5}) + 2 χ (λ_{1}, λ_{4}, λ_{6}) \\ - 2 χ (λ_{2}, λ_{3}, λ_{6}) + 2 χ (λ_{2}, λ_{4}, λ_{5}), T) \\ ⪰ N (λ [2 χ (\frac{λ_{1} + λ_{2}}{2}, λ_{3} - λ_{4}, λ_{5} + λ_{6}) + 2 χ (\frac{λ_{1} - λ_{2}}{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}) \\ - 2 χ (λ_{1}, λ_{3}, λ_{5}) + 2 χ (λ_{1}, λ_{4}, λ_{6}) \\ - 2 χ (λ_{2}, λ_{3}, λ_{6}) + 2 χ (λ_{2}, λ_{4}, λ_{5})], T) \\ ⨂_{GTN} Diagonal [{AG}_{1} (Diagonal [ \\ E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{2} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + ∥ λ_{4} ∥^{r_{1}} + ∥ λ_{5} ∥^{r_{1}} + ∥ λ_{6} ∥^{r_{1}}]}{T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{2} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + ∥ λ_{4} ∥^{r_{5}} + ∥ λ_{5} ∥^{r_{5}} + ∥ λ_{6} ∥^{r_{5}}]}{T})]), \dots, \\ {AG}_{15} (Diagonal [E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{2} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + ∥ λ_{4} ∥^{r_{1}} + ∥ λ_{5} ∥^{r_{1}} + ∥ λ_{6} ∥^{r_{1}}]}{T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{2} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + ∥ λ_{4} ∥^{r_{5}} + ∥ λ_{5} ∥^{r_{5}} + ∥ λ_{6} ∥^{r_{5}}]}{T})])], \end{matrix}

(53)

for all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in G

. Then, we can obtain a unique tri-additive mapping

χ^{'} : G^{3} \to P

satisfying

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - χ^{'} (λ_{1}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [σ_{1}, \dots, σ_{15}], \end{matrix}

(54)

in which

\begin{matrix} Diagonal [σ_{1}, \dots, σ_{15}] \\ : = Diagonal [{AG}_{1} (Diagonal [E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + 2 \frac{∥ λ_{3} ∥^{r_{1}}}{2^{r_{1}}} + ∥ λ_{5} ∥^{r_{1}}]}{(1 - 4 ϑ_{1}) T}) \\ ⨂_{TN} E_{1} (- \frac{Ψ_{1} [\frac{2 ∥ λ_{1} ∥^{r_{1}}}{2^{r_{1}}} + 2 \frac{∥ λ_{3} ∥^{r_{1}}}{2^{r_{1}}} + ∥ λ_{5} ∥^{r_{1}}]}{\frac{(1 - 4 ϑ_{1})}{2} T}) \\ ⨂_{TN} E_{1} (- \frac{Ψ_{1} [\frac{∥ λ_{1} ∥^{r_{1}}}{2^{r_{1}}} + \frac{∥ λ_{3} ∥^{r_{1}}}{2^{r_{1}}} + \frac{∥ λ_{5} ∥^{r_{1}}}{2^{r_{1}}}]}{\frac{(1 - 4 ϑ_{1})}{4} T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + 2 \frac{∥ λ_{3} ∥^{r_{5}}}{2^{r_{5}}} + ∥ λ_{5} ∥^{r_{5}}]}{(1 - 4 ϑ_{5}) T}) \\ ⨂_{TN} E_{5} (- \frac{Ψ_{5} [\frac{2 ∥ λ_{1} ∥^{r_{5}}}{2^{r_{5}}} + 2 \frac{∥ λ_{3} ∥^{r_{5}}}{2^{r_{5}}} + ∥ λ_{5} ∥^{r_{5}}]}{\frac{(1 - 4 ϑ_{5})}{2} T}) \\ ⨂_{TN} E_{5} (- \frac{Ψ_{5} [\frac{∥ λ_{1} ∥^{r_{5}}}{2^{r_{5}}} + \frac{∥ λ_{3} ∥^{r_{5}}}{2^{r_{5}}} + \frac{∥ λ_{5} ∥^{r_{5}}}{2^{r_{5}}}]}{\frac{(1 - 4 ϑ_{5})}{4} T})]), \dots, \\ {AG}_{15} (Diagonal [E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + 2 \frac{∥ λ_{3} ∥^{r_{1}}}{2^{r_{1}}} + ∥ λ_{5} ∥^{r_{1}}]}{(1 - 4 ϑ_{1}) T}) \\ ⨂_{TN} E_{1} (- \frac{Ψ_{1} [\frac{2 ∥ λ_{1} ∥^{r_{1}}}{2^{r_{1}}} + 2 \frac{∥ λ_{3} ∥^{r_{1}}}{2^{r_{1}}} + ∥ λ_{5} ∥^{r_{1}}]}{\frac{(1 - 4 ϑ_{1})}{2} T}) \\ ⨂_{TN} E_{1} (- \frac{Ψ_{1} [\frac{∥ λ_{1} ∥^{r_{1}}}{2^{r_{1}}} + \frac{∥ λ_{3} ∥^{r_{1}}}{2^{r_{1}}} + \frac{∥ λ_{5} ∥^{r_{1}}}{2^{r_{1}}}]}{\frac{(1 - 4 ϑ_{1})}{4} T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + 2 \frac{∥ λ_{3} ∥^{r_{5}}}{2^{r_{5}}} + ∥ λ_{5} ∥^{r_{5}}]}{(1 - 4 ϑ_{5}) T}) \\ ⨂_{TN} E_{5} (- \frac{Ψ_{5} [\frac{2 ∥ λ_{1} ∥^{r_{5}}}{2^{r_{5}}} + 2 \frac{∥ λ_{3} ∥^{r_{5}}}{2^{r_{5}}} + ∥ λ_{5} ∥^{r_{5}}]}{\frac{(1 - 4 ϑ_{5})}{2} T}) \\ ⨂_{TN} E_{5} (- \frac{Ψ_{5} [\frac{∥ λ_{1} ∥^{r_{5}}}{2^{r_{5}}} + \frac{∥ λ_{3} ∥^{r_{5}}}{2^{r_{5}}} + \frac{∥ λ_{5} ∥^{r_{5}}}{2^{r_{5}}}]}{\frac{(1 - 4 ϑ_{5})}{4} T})])], \end{matrix}

(55)

where

ϑ_{i} = 2^{r_{i} - 1}

, for all

λ_{1}, λ_{3}, λ_{5} \in G

.

Corollary 2.

Let

T \geq 0

and

r_{i} < 3

,

Ψ_{i} > 0

be in

R

, and

χ : G^{3} \to P

be a mapping satisfying

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

and (53) . Then, we can obtain a unique tri-additive mapping

χ^{'} : G^{3} \to P

satisfying

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - χ^{'} (λ_{1}, λ_{3}, λ_{5}), T) ⪰ Diagonal {[σ^{'}, \dots, σ^{'}]}_{15 \times 15} \end{matrix}

(56)

in which

\begin{matrix} Diagonal {[σ^{'}, \dots, σ^{'}]}_{15 \times 15} \\ : = Diagonal [{AG}_{1} (Diagonal [E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + 2 ∥ λ_{3} ∥^{r_{1}} + ∥ λ_{5} ∥^{r_{1}}]}{(8 - 2 ϑ_{1}) T}) \\ ⨂_{TN} E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + 2^{r_{1}} ∥ λ_{5} ∥^{r_{1}}]}{(4 - ϑ_{1}) T}) \\ ⨂_{TN} E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + 2 ∥ λ_{5} ∥^{r_{1}}]}{\frac{(4 - ϑ_{1})}{2} T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + 2 ∥ λ_{3} ∥^{r_{5}} + ∥ λ_{5} ∥^{r_{5}}]}{(8 - 2 ϑ_{5}) T}) \\ ⨂_{TN} E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + 2^{r_{5}} ∥ λ_{5} ∥^{r_{5}}]}{(4 - ϑ_{5}) T}) \\ ⨂_{TN} E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + 2 ∥ λ_{5} ∥^{r_{5}}]}{\frac{(4 - ϑ_{5})}{2} T})]_{5 \times 5}), \dots, \\ {AG}_{15} (Diagonal [E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + 2 ∥ λ_{3} ∥^{r_{1}} + ∥ λ_{5} ∥^{r_{1}}]}{(8 - 2 ϑ_{1}) T}) \\ ⨂_{TN} E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + 2^{r_{1}} ∥ λ_{5} ∥^{r_{1}}]}{(4 - ϑ_{1}) T}) \\ ⨂_{TN} E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + 2 ∥ λ_{5} ∥^{r_{1}}]}{\frac{(4 - ϑ_{1})}{2} T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + 2 ∥ λ_{3} ∥^{r_{5}} + ∥ λ_{5} ∥^{r_{5}}]}{(8 - 2 ϑ_{5}) T}) \\ ⨂_{TN} E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + 2^{r_{5}} ∥ λ_{5} ∥^{r_{5}}]}{(4 - ϑ_{5}) T}) \\ ⨂_{TN} E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + 2 ∥ λ_{5} ∥^{r_{5}}]}{\frac{(4 - ϑ_{5})}{2} T})]_{5 \times 5})]_{15 \times 15}, \end{matrix}

(57)

where

ϑ_{i} = 2^{r_{i} + 1}

, for all

λ_{1}, λ_{3}, λ_{5} \in G

.

Corollary 3.

Let

T \geq 0

,

r_{i} > 4

and

Ψ_{i} > 0

be in

R

, and

χ : ν^{3} \to ν

be a mapping satisfying

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

and

\begin{matrix} N (χ (Λ_{1} (λ_{1} + λ_{2}), Λ_{2} (λ_{3} - λ_{4}), Λ_{3} (λ_{5} + λ_{6})) \\ + χ (Λ_{1} (λ_{1} - λ_{2}), Λ_{2} (λ_{3} + λ_{4}), Λ_{3} (λ_{5} - λ_{6})) \\ - Λ_{1} Λ_{2} Λ_{3} (2 χ (λ_{1}, λ_{3}, λ_{5}) - 2 χ (λ_{1}, λ_{4}, λ_{6}) \\ + 2 χ (λ_{2}, λ_{3}, λ_{6}) - 2 χ (λ_{2}, λ_{4}, λ_{5})), T) \\ ⪰ N (λ [2 χ (\frac{λ_{1} + λ_{2}}{2}, λ_{3} - λ_{4}, λ_{5} + λ_{6}) + 2 χ (\frac{λ_{1} - λ_{2}}{2}, λ_{3} + λ_{4}, λ_{5} - λ_{6}] \\ - 2 χ (λ_{1}, λ_{3}, λ_{5}) + 2 χ (λ_{1}, λ_{4}, λ_{6}) \\ - 2 χ (λ_{2}, λ_{3}, λ_{6}) + 2 χ (λ_{2}, λ_{4}, λ_{5})], T) \\ ⨂_{GTN} Diagonal [{AG}_{1} (Diagonal [ \\ E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{2} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + ∥ λ_{4} ∥^{r_{1}} + ∥ λ_{5} ∥^{r_{1}} + ∥ λ_{6} ∥^{r_{1}}]}{T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{2} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + ∥ λ_{4} ∥^{r_{5}} + ∥ λ_{5} ∥^{r_{5}} + ∥ λ_{6} ∥^{r_{5}}]}{T})]_{5 \times 5}), \dots, \\ {AG}_{15} (Diagonal [E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{2} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + ∥ λ_{4} ∥^{r_{1}} + ∥ λ_{5} ∥^{r_{1}} + ∥ λ_{6} ∥^{r_{1}}]}{T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{2} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + ∥ λ_{4} ∥^{r_{5}} + ∥ λ_{5} ∥^{r_{5}} + ∥ λ_{6} ∥^{r_{5}}]}{T})]_{5 \times 5})]_{15 \times 15} \end{matrix}

(58)

for all

Λ_{1}, Λ_{2}, Λ_{3} \in Δ^{1}

and all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in ν

. Then, we can obtain a unique

C -

trilinear mapping

ϖ : ν^{3} \to ν

satisfying

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - ϖ (λ_{1}, λ_{3}, λ_{5}), T) ⪰ Diagonal [σ_{1}, \dots, σ_{15}] \end{matrix}

where

Diagonal [σ_{1}, \dots, σ_{15}]

satisfies (55) for all

λ_{1}, λ_{3}, λ_{5} \in ν

.

In addition, if the mapping

χ : ν^{3} \to ν

satisfies

χ (2 λ_{1}, λ_{3}, λ_{5}) = 2 χ (λ_{1}, λ_{3}, λ_{5})

and

\begin{matrix} N (χ (λ_{1} λ_{2}, λ_{3}, λ_{5}) - χ (λ_{1}, λ_{3}, λ_{5}) λ_{2} - λ_{1} χ (λ_{2}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [{AG}_{1} (Diagonal [ \\ E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{2} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + ∥ λ_{4} ∥^{r_{1}} + ∥ λ_{5} ∥^{r_{1}} + ∥ λ_{6} ∥^{r_{1}}]}{T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{2} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + ∥ λ_{4} ∥^{r_{5}} + ∥ λ_{5} ∥^{r_{5}} + ∥ λ_{6} ∥^{r_{5}}]}{T})]_{5 \times 5}), \dots, \\ {AG}_{15} (Diagonal [E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{2} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + ∥ λ_{4} ∥^{r_{1}} + ∥ λ_{5} ∥^{r_{1}} + ∥ λ_{6} ∥^{r_{1}}]}{T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{2} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + ∥ λ_{4} ∥^{r_{5}} + ∥ λ_{5} ∥^{r_{5}} + ∥ λ_{6} ∥^{r_{5}}]}{T})]_{5 \times 5})]_{15 \times 15}, \end{matrix}

(59)

and

\begin{matrix} N (χ (ℓ_{β (1)}, ℓ_{β (2)}, ℓ_{β (3)}) - χ (ℓ_{1}, ℓ_{2}, ℓ_{3}), T) \\ ⪰ Diagonal [{AG}_{1} (Diagonal [ \\ E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{2} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + ∥ λ_{4} ∥^{r_{1}} + ∥ λ_{5} ∥^{r_{1}} + ∥ λ_{6} ∥^{r_{1}}]}{T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{2} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + ∥ λ_{4} ∥^{r_{5}} + ∥ λ_{5} ∥^{r_{5}} + ∥ λ_{6} ∥^{r_{5}}]}{T})]_{5 \times 5}), \dots, \\ {AG}_{15} (Diagonal [E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{2} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + ∥ λ_{4} ∥^{r_{1}} + ∥ λ_{5} ∥^{r_{1}} + ∥ λ_{6} ∥^{r_{1}}]}{T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{2} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + ∥ λ_{4} ∥^{r_{5}} + ∥ λ_{5} ∥^{r_{5}} + ∥ λ_{6} ∥^{r_{5}}]}{T})]_{5 \times 5})]_{15 \times 15} \end{matrix}

(60)

for all permutations

(β (1), β (2), β (3))

of

(1, 2, 3)

, and for all

λ_{1}, λ_{2}, λ_{3}, ℓ_{1}, ℓ_{2}, ℓ_{3}, λ_{5} \in ν

, then, the

C -

trilinear mapping

ϖ : ν^{3} \to ν

is a permuting tri-derivation.

Corollary 4.

Let

T \geq 0

,

r_{i} < 3

and

Ψ_{i} > 0

be in

R

, and

χ : ν^{3} \to ν

be a mapping satisfying (58) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

, for all

λ_{1}, λ_{3}, λ_{5} \in ν

. Then, we can find a unique

C -

trilinear mapping

ϖ : ν^{3} \to ν

satisfying

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - ϖ (λ_{1}, λ_{3}, λ_{5}), T) ⪰ Diagonal [σ_{1}^{'}, \dots, σ_{15}^{'}], \end{matrix}

(61)

where

Diagonal [σ_{1}^{'}, \dots, σ_{n}^{'}]

satisfies (57), for all

λ_{1}, λ_{3}, λ_{5} \in ν

.

Also, if the mapping

χ : ν^{3} \to ν

satisfies (59), (60) and

χ (2 λ_{1}, λ_{3}, λ_{5}) = 2 χ (λ_{1}, λ_{3}, λ_{5})

for all

λ_{1}, λ_{3}, λ_{5} \in ν

, then the

C -

trilinear mapping

ϖ : ν^{3} \to ν

is a permuting tri-derivation.

Corollary 5.

Let

T \geq 0

,

r_{i} > 4

and

Ψ_{i} > 0

be in

R

, and

χ : ν^{3} \to ν

be a mapping satisfying (58) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

for all

λ_{1}, λ_{3}, λ_{5} \in ν

. Then, we can find a unique

C -

trilinear mapping

ϖ : ν^{3} \to ν

satisfying (59).

Also, if the mapping

χ : ν^{3} \to ν

satisfies (60) ,

χ (2 ϕ, λ_{3}, λ_{5}) = 2 χ (ϕ, λ_{3}, λ_{5})

and

\begin{matrix} N (χ (ϕ λ_{2}, λ_{3}, λ_{5}) - χ (ϕ, λ_{3}, λ_{5}) λ_{2} - ϕ χ (λ_{2}, λ_{3}, λ_{5}), T) \\ ⪰ Diagonal [{AG}_{1} (Diagonal [E_{1} (- \frac{Ψ_{1} [1 + ∥ λ_{2} ∥^{r_{1}} + 2 ∥ λ_{3} ∥^{r_{1}} + 2 ∥ λ_{5} ∥^{r_{1}}]}{T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [1 + ∥ λ_{2} ∥^{r_{5}} + 2 ∥ λ_{3} ∥^{r_{5}} + 2 ∥ λ_{5} ∥^{r_{5}}]}{T})]_{5 \times 5}), \dots, \\ {AG}_{15} (Diagonal [E_{1} (- \frac{Ψ_{1} [1 + ∥ λ_{2} ∥^{r_{1}} + 2 ∥ λ_{3} ∥^{r_{1}} + 2 ∥ λ_{5} ∥^{r_{1}}]}{T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [1 + ∥ λ_{2} ∥^{r_{5}} + 2 ∥ λ_{3} ∥^{r_{5}} + 2 ∥ λ_{5} ∥^{r_{5}}]}{T})]_{5 \times 5})]_{15 \times 15}, \end{matrix}

(62)

for any

ϕ \in U (ν)

and all

λ_{2}, λ_{3}, λ_{5} \in ν

, then the

C -

trilinear mapping

ϖ : ν^{3} \to ν

is a permuting tri-derivation.

Corollary 6.

Let

T \geq 0

,

r_{i} < 3

and

Ψ_{i} > 0

be in

R

, and

χ : ν^{3} \to ν

be a mapping satisfying (58) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

for all

λ_{1}, λ_{3}, λ_{5} \in ν

. Then, we can obtain a unique

C -

trilinear mapping

ϖ : ν^{3} \to ν

satisfying (61).

In addition, if the mapping

χ : ν^{3} \to ν

satisfies (60), (62) and

χ (2 ϕ, λ_{3}, λ_{5}) = 2 χ (ϕ, λ_{3}, λ_{5})

for all

ϕ \in U (ν)

and all

λ_{3}, λ_{5} \in ν

, then the

C -

trilinear mapping

ϖ : ν^{3} \to ν

is a permuting tri-derivation.

Corollary 7.

Let

T \geq 0

,

r_{i} > 6

and

Ψ_{i} > 0

be in

R

, and

χ : ν^{3} \to Θ

be a mapping satisfying (58) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

for all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in ν

. Then, we can find a unique

C -

trilinear mapping

ρ : ν^{3} \to Θ

satisfying

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{5}) - ρ (λ_{1}, λ_{3}, λ_{4}), T) ⪰ Diagonal [σ_{1}, \dots, σ_{15}] \end{matrix}

(63)

in which

Diagonal [σ_{1}, \dots, σ_{15}]

satisfies (55), for all

λ_{1}, λ_{3}, λ_{5} \in ν

.

Also, if the mapping

χ : ν^{3} \to Θ

satisfies (60) and

\begin{matrix} N (χ (λ_{1} λ_{2}, λ_{3} λ_{4}, λ_{5} λ_{6}) - χ (λ_{1}, λ_{3}, λ_{5}) χ (λ_{2}, λ_{4}, λ_{6}), T) \\ ⪰ Diagonal [{AG}_{1} (Diagonal [ \\ E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{2} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + ∥ λ_{4} ∥^{r_{1}} + ∥ λ_{5} ∥^{r_{1}} + ∥ λ_{6} ∥^{r_{1}}]}{T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{2} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + ∥ λ_{4} ∥^{r_{5}} + ∥ λ_{5} ∥^{r_{5}} + ∥ λ_{6} ∥^{r_{5}}]}{T})]_{5 \times 5}), \dots, \\ {AG}_{15} (Diagonal [E_{1} (- \frac{Ψ_{1} [∥ λ_{1} ∥^{r_{1}} + ∥ λ_{2} ∥^{r_{1}} + ∥ λ_{3} ∥^{r_{1}} + ∥ λ_{4} ∥^{r_{1}} + ∥ λ_{5} ∥^{r_{1}} + ∥ λ_{6} ∥^{r_{1}}]}{T}), \dots, \\ E_{5} (- \frac{Ψ_{5} [∥ λ_{1} ∥^{r_{5}} + ∥ λ_{2} ∥^{r_{5}} + ∥ λ_{3} ∥^{r_{5}} + ∥ λ_{4} ∥^{r_{5}} + ∥ λ_{5} ∥^{r_{5}} + ∥ λ_{6} ∥^{r_{5}}]}{T})]_{5 \times 5})]_{15 \times 15}, \end{matrix}

(64)

for all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in ν

, then, the

C -

trilinear mapping

ρ : ν^{3} \to Θ

is a permuting tri-homomorphism.

Corollary 8.

Let

T \geq 0

,

r_{i} < 3

and

Ψ_{i} > 0

be in

R

, and

χ : ν^{3} \to Θ

be a mapping satisfying (58) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

for all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in ν

. Then, we can find a unique

C -

trilinear mapping

ρ : ν^{3} \to Θ

satisfying

\begin{matrix} N (χ (λ_{1}, λ_{3}, λ_{4}) - ρ (λ_{1}, λ_{3}, λ_{4}), T) ⪰ Diagonal {[σ_{1}^{'}, \dots, σ_{1}^{'}]}_{15 \times 15} \end{matrix}

(65)

where

Diagonal {[σ_{1}^{'}, \dots, σ_{1}^{'}]}_{15 \times 15}

satisfies (57), for all

λ_{1}, λ_{3}, λ_{5} \in ν

.

Besides, if the mapping

χ : ν^{3} \to Θ

satisfies (60) and (64) , then the

C -

trilinear mapping

ρ : ν^{3} \to Θ

is a permuting tri-homomorphism.

Corollary 9.

Let

T \geq 0

,

r_{i} > 6

and

Ψ_{i} > 0

be in

R

, and

χ : ν^{3} \to Θ

be a mapping satisfying (58) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

for all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in ν

. Then, we can find a unique

C -

trilinear mapping

ρ : ν^{3} \to Θ

satisfying (63).

Also, if the mapping

χ : ν^{3} \to Θ

satisfies (60) and

\begin{matrix} N (χ (ϕ_{1} φ_{1}, ϕ_{2} φ_{2}, ϕ_{3} φ_{3}) - χ (ϕ_{1}, ϕ_{2}, ϕ_{3}) χ (φ_{1}, φ_{2}, φ_{3}), T) ⪰ Diagonal {[6 T, \dots, 6 T]}_{15 \times 15}, \end{matrix}

(66)

for all

ϕ_{i}, φ_{i} \in U (ν)

,

i = 1, 2, 3,

then, the

C -

trilinear mapping

ρ : ν^{3} \to Θ

is a permuting tri-homomorphism.

Corollary 10.

Let

T \geq 0

,

r_{i} < 3

and

Ψ_{i} > 0

be in

R

, and

χ : ν^{3} \to Θ

be a mapping satisfying (58) and

χ (λ_{1}, 0, λ_{5}) = χ (0, λ_{3}, λ_{5}) = χ (λ_{1}, λ_{3}, 0) = 0

for all

λ_{1}, λ_{2}, λ_{3}, λ_{4}, λ_{5}, λ_{6} \in ν

. Then, we can find a unique

C -

trilinear mapping

ρ : ν^{3} \to Θ

satisfying (65).

Besides, if

χ : ν^{3} \to Θ

satisfies (60) and (66) , then, the

C -

trilinear mapping

ρ : ν^{3} \to Θ

is a permuting tri-homomorphism.

6. Conclusions

The main goal of the paper is to propose a new concept of Ulam-type stability, i.e., multi-stability, through the classical, well-known special functions and aggregation maps, and to gain the best approximation error estimates by a diverse concept of perturbation stability in fuzzy spaces. This stability allows us to get various approximations depending on the different special functions and aggregation maps that are initially chosen and to evaluate optimal stability and minimal error which enable us to obtain a unique optimum solution of functional equations. Stability analysis, in the sense of Ulam and others, has received considerable attention from researchers. However, the effective generalization of Ulam stability problems and evaluating optimized controllability and stability are new issues. The multi-stability covers not only the previous concepts, but also considers the optimization of the problem. Multi-stability provides a comprehensive discussion of optimizing the different types of Ulam stabilities of mathematical models used in the natural sciences (like: physics, earth science, biology, chemistry), social sciences (like: psychology, economics, political science, sociology) and engineering sciences (like: electrical engineering, computer science). This stability allows us to obtain the best approximation results of optimal control problems through classes of special functions.

Author Contributions

Methodology, C.L.; Validation, D.O.; Writing—original draft, S.R.A. and D.O.; Writing—review & editing, R.S., D.O. and C.L.; Supervision, R.S. All of the authors conceived of the study, participated in its design and coordination, drafted the manuscript, and participated in the sequence alignment. All authors have read and agreed to the published version of the manuscript.

Funding

This research received no external funding.

Data Availability Statement

Not applicable.

Acknowledgments

The authors thank the anonymous referees for their helpful comments that improved the quality of the manuscript. Chenkuan Li is supported by the Natural Sciences and Engineering Research Council of Canada (Grant No. 2019-03907).

Conflicts of Interest

The authors declare no conflict of interest.

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Aderyani, S.R.; Saadati, R.; O’Regan, D.; Li, C. On a New Approach for Stability and Controllability Analysis of Functional Equations. Mathematics 2023, 11, 3458. https://doi.org/10.3390/math11163458

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Aderyani SR, Saadati R, O’Regan D, Li C. On a New Approach for Stability and Controllability Analysis of Functional Equations. Mathematics. 2023; 11(16):3458. https://doi.org/10.3390/math11163458

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Aderyani, Safoura Rezaei, Reza Saadati, Donal O’Regan, and Chenkuan Li. 2023. "On a New Approach for Stability and Controllability Analysis of Functional Equations" Mathematics 11, no. 16: 3458. https://doi.org/10.3390/math11163458

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On a New Approach for Stability and Controllability Analysis of Functional Equations

Abstract

1. Introduction and Preliminaries

2. Tri-Additive $λ$ -Functional Inequality (1)

3. Permuting Tri-Derivations on MFB-Algebras

4. Permuting Tri-Homomorphisms in MFC-⋄-Aalgebras

5. Application

6. Conclusions

Author Contributions

Funding

Data Availability Statement

Acknowledgments

Conflicts of Interest

References

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On a New Approach for Stability and Controllability Analysis of Functional Equations

Abstract

1. Introduction and Preliminaries

2. Tri-Additive λ -Functional Inequality (1)

3. Permuting Tri-Derivations on MFB-Algebras

4. Permuting Tri-Homomorphisms in MFC-⋄-Aalgebras

5. Application

6. Conclusions

Author Contributions

Funding

Data Availability Statement

Acknowledgments

Conflicts of Interest

References

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2. Tri-Additive $λ$ -Functional Inequality (1)