Litcius/Paper detail

Equivariant Hopf Bifurcation in a Class of Partial Functional Differential Equations on a Circular Domain

Y. Chen, Xianyi Zeng, Ben Niu

2024International Journal of Bifurcation and Chaos10 citationsDOI

Abstract

Circular domains frequently appear in mathematical modeling in the fields of ecology, biology and chemistry. In this paper, we investigate the equivariant Hopf bifurcation of partial functional differential equations with Neumann boundary condition on a two-dimensional disk. The properties of these bifurcations at equilibriums are analyzed rigorously by studying the equivariant normal forms. Two reaction–diffusion systems with discrete time delays are selected as numerical examples to verify the theoretical results, in which spatially inhomogeneous periodic solutions including standing waves and rotating waves, and spatially homogeneous periodic solutions are found near the bifurcation points.

Topics & Concepts

Equivariant mapMathematicsHopf bifurcationClass (philosophy)Domain (mathematical analysis)Mathematical analysisSaddle-node bifurcationBifurcationPure mathematicsPhysicsComputer scienceNonlinear systemQuantum mechanicsArtificial intelligenceadvanced mathematical theoriesAdvanced Differential Equations and Dynamical SystemsQuantum chaos and dynamical systems