Litcius/Paper detail

Stable discontinuous stationary solutions to reaction-diffusion-ODE systems

Szymon Cygan, Anna Marciniak‐Czochra, Grzegorz Karch, Kanako Suzuki

2023Communications in Partial Differential Equations11 citationsDOI

Abstract

A general system of n ordinary differential equations coupled with one reaction-diffusion equation, considered in a bounded N-dimensional domain, with no-flux boundary condition is studied in a context of pattern formation. Such initial boundary value problems may have different types of stationary solutions. In our parallel work [Instability of all regular stationary solutions to reaction-diffusion-ODE systems (2021)], regular (i.e. sufficiently smooth) stationary solutions are shown to exist, however, all of them are unstable. The goal of this work is to construct discontinuous stationary solutions to general reaction-diffusion-ODE systems and to find sufficient conditions for their stability.

Topics & Concepts

OdeMathematicsReaction–diffusion systemOrdinary differential equationBounded functionContext (archaeology)Mathematical analysisDomain (mathematical analysis)Work (physics)Partial differential equationInstabilityDiffusionBoundary value problemDifferential equationThermodynamicsPhysicsMechanicsPaleontologyBiologyDifferential Equations and Numerical MethodsNonlinear Dynamics and Pattern FormationAdvanced Mathematical Modeling in Engineering