Differential Models, Numerical Simulations and Applications

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conservation laws; feedback stabilization; input-to-state stability; numerical approximations; nonlocal velocity; macroscopic models; traffic data; gap analysis; multi-phase models; Volterra integral equations; asymptotic-preserving; numerical stability; Cellular Potts model; cell migration; nucleus deformation; microchannel device; regularization theory; multivariate stochastic processes; cross-power spectrum; magnetoencephalography; MEG; functional connectivity; spectral complexity; soil organic carbon; RothC; non-standard integrators; Exponential Rosenbrock–Euler; langevin equation; Mean Field Games system; kinetic Fokker–Planck equation; hypoelliptic operators; Caputo fractional derivative; Allee effect; existence and stability; Hopf bifurcation; implicit schemes; optimal design; soft tissue mechanics; mutual information; biaxial experiment; inverse problems; information theory; LWR model; follow-the-leader model; phase transition; creeping; seepage; fundamental diagram; lane discipline; networks; aggregation equation; relaxation limit; scalar conservation law; finite volume scheme; differential equations; mathematical biology; cell migration; microfluidic chip; applied mathematics; numerical methods; computational mathematics; differential and integro-differential models; inverse problems