Reprint
Mathematical Models and Simulations
Edited by
March 2024
266 pages
- ISBN978-3-7258-0509-9 (Hardback)
- ISBN978-3-7258-0510-5 (PDF)
This is a Reprint of the Special Issue Mathematical Models and Simulations that was published in
Computer Science & Mathematics
Physical Sciences
Summary
Mathematical models constitute a fundamental tool for the understanding of physical phenomena, biological systems, and finance and engineering. In addition to theoretical aspects, simulations play a primary role in applications because they allow for the prediction of the behavior of quantities of interest. The aim of this reprint is to present original research of the contributing authors, providing the reader with a sample of actual investigation in the field of applied mathematics.
Format
- Hardback
License and Copyright
© 2022 by the authors; CC BY-NC-ND license
Keywords
delay differential equation; ordinary differential equation; pantograph; analytic solution; exact solution; fractional differential equations of variable order; finite delay; boundary-value problem; fixed-point theorem; green function; Ulam–Hyers stability; ODE; convergence; sequence; algebraic decomposition; numerical solution; influenza; COVID-19; co-infection; time delay; global stability; Lyapunov function; Monte Carlo methods; statistical mechanics of semiconductors; heat transfer; caputo derivative; polytropic gas; ?-transform; variational calculus; optimal homotopy analysis method; stochastic KP; fractional KP; stability by noise; exact solution; beta derivative; rRs(P,Q,z) matrix function; recurrence relation; integral representation; generalized (Wright) hypergeometric matrix functions; Mittag–Leffler matrix function; fractional integral; derivative operators; Fourier series; cyber threat; piecewise continuous function; mathematical model; information security of an enterprise; local influence techniques; log-symmetric distributions family; PM2.5 levels; quantile regression; semiparametric models; commensalism model; additive Allee; flip bifurcation; transcritical bifurcation; pitchfork bifurcation; fold bifurcation; chaos control; nondimensionalisation; universal solution; mathematical modelling; numerical simulation; engineering science; ordinary differential equations; Parkinson’s disease model; delay; instability; oscillatory solution; n/a