TY - BOOK ID - 146035984 TI - Models of Delay Differential Equations AU - Rodríguez, Francisco AU - Cortés López, Juan Carlos AU - Castro, María Ángeles PY - 2021 PB - Basel, Switzerland MDPI - Multidisciplinary Digital Publishing Institute DB - UniCat KW - Research & information: general KW - Mathematics & science KW - delay systems KW - nonstandard numerical methods KW - dynamic consistency KW - semilinear problems with delay KW - hyperbolic equations KW - difference scheme KW - stability KW - Hilbert space KW - SEIRS model KW - age structure KW - time delay KW - traveling wave solution KW - local asymptotic stability KW - Hopf bifurcation KW - spot freight rates KW - freight options KW - stochastic diffusion process KW - stochastic delay differential equation KW - risk-neutral measure KW - arbitration arguments KW - partial differential equations KW - second-order dual phase lag equation KW - laser heating KW - thin metal films KW - melting and resolidification KW - finite difference method KW - random linear delay differential equation KW - stochastic forcing term KW - random Lp-calculus KW - uncertainty quantification KW - delay random differential equation KW - non-standard finite difference method KW - mean square convergence KW - size-structured population KW - consumer-resource model KW - delay differential equation KW - numerical methods KW - characteristics method KW - convergence analysis KW - implementation delay KW - information delay KW - stability switching curve KW - Cournot oligopoly KW - growth rate dynamics KW - fractional convection diffusion-wave equations KW - compact difference scheme KW - nonlinear delay KW - spatial variable coefficients KW - convergence and stability KW - Gerasimov–Caputo fractional derivative KW - differential equation with delay KW - degenerate evolution equation KW - fixed point theorem KW - relaxation mode KW - large parameter KW - asymptotics KW - HIV infection KW - mathematical delay model KW - eclipse phase KW - NSFD KW - numerical simulation KW - delay systems KW - nonstandard numerical methods KW - dynamic consistency KW - semilinear problems with delay KW - hyperbolic equations KW - difference scheme KW - stability KW - Hilbert space KW - SEIRS model KW - age structure KW - time delay KW - traveling wave solution KW - local asymptotic stability KW - Hopf bifurcation KW - spot freight rates KW - freight options KW - stochastic diffusion process KW - stochastic delay differential equation KW - risk-neutral measure KW - arbitration arguments KW - partial differential equations KW - second-order dual phase lag equation KW - laser heating KW - thin metal films KW - melting and resolidification KW - finite difference method KW - random linear delay differential equation KW - stochastic forcing term KW - random Lp-calculus KW - uncertainty quantification KW - delay random differential equation KW - non-standard finite difference method KW - mean square convergence KW - size-structured population KW - consumer-resource model KW - delay differential equation KW - numerical methods KW - characteristics method KW - convergence analysis KW - implementation delay KW - information delay KW - stability switching curve KW - Cournot oligopoly KW - growth rate dynamics KW - fractional convection diffusion-wave equations KW - compact difference scheme KW - nonlinear delay KW - spatial variable coefficients KW - convergence and stability KW - Gerasimov–Caputo fractional derivative KW - differential equation with delay KW - degenerate evolution equation KW - fixed point theorem KW - relaxation mode KW - large parameter KW - asymptotics KW - HIV infection KW - mathematical delay model KW - eclipse phase KW - NSFD KW - numerical simulation UR - https://www.unicat.be/uniCat?func=search&query=sysid:146035984 AB - This book gathers a number of selected contributions aimed at providing a balanced picture of the main research lines in the realm of delay differential equations and their applications to mathematical modelling. The contributions have been carefully selected so that they cover interesting theoretical and practical analysis performed in the deterministic and the stochastic settings. The reader will find a complete overview of recent advances in ordinary and partial delay differential equations with applications in other multidisciplinary areas such as Finance, Epidemiology or Engineering ER -