Modeling and Numerical Analysis of Energy and Environment 2022
A special issue of Mathematics (ISSN 2227-7390). This special issue belongs to the section "Engineering Mathematics".
Deadline for manuscript submissions: closed (31 December 2022) | Viewed by 2286
Special Issue Editors
Interests: numerical simulation; finite volume methods; environmental applications; computational fluid dynamics
Special Issues, Collections and Topics in MDPI journals
Special Issue Information
Dear Colleagues,
Energy and the environment are both important topics nowadays in order to sustainably develop our world. In particular, climate change is a major concern, for which advances in energy efficiency play a fundamental role. In order to represent and predict the behavior of these systems, mathematical modeling and numerical simulation of the models are useful tools.
This Special Issue focuses on mathematical modeling and numerical simulation of the energy and environmental systems linked to different applications, such as renewable energy (onshore and offshore wind energy, thermosolar and photovoltaic energy, biomass, etc.); nuclear fusion; and the study of plasma, shallow water models, water, air or soil pollution, multiphase flows or energy balance models relevant in architecture. The mathematical models involved in those applications include heat and mass transfer problems, Navier–Stokes models, magneto-hydrodynamic (MHD) equations, Euler equations for gas dynamics, shallow water models or advection–reaction–diffusion equations, to name a few. With the aim of solving mathematical models, numerical schemes based on finite volume methods, finite element methods, finite difference techniques and the discontinuous Galerkin approach are of interest for this Special Issue.
Prof. Dr. Arturo Hidalgo
Prof. Dr. Lourdes Tello
Guest Editors
Manuscript Submission Information
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Keywords
- mathematical modelling in energy and the environment
- efficient numerical schemes
- heat transfer in industry and buildings
- aerodynamics
- fluid dynamics
- shallow water models, dam-break
- multiphase flows, flow in porous media
