STABLE STATIONARY SOLUTIONS IN REACTION–DIFFUSION SYSTEMS CONSISTING OF A 1-D ARRAY OF BISTABLE CELLS
From MaRDI portal
Publication:4736342
DOI10.1142/S0218127402004322zbMath1042.35028WikidataQ129039225 ScholiaQ129039225MaRDI QIDQ4736342
I. L. Nizhnik, Martin Hasler, Leonid P. Nizhnik
Publication date: 9 August 2004
Published in: International Journal of Bifurcation and Chaos (Search for Journal in Brave)
Reaction-diffusion equations (35K57) Lattice dynamics and infinite-dimensional dissipative dynamical systems (37L60)
Related Items (6)
Differential equations with bistable nonlinearity ⋮ Solitary states for coupled oscillators with inertia ⋮ Chimera at the phase-flip transition of an ensemble of identical nonlinear oscillators ⋮ The Turing bifurcation in network systems: collective patterns and single differentiated nodes ⋮ Kinklike solutions of fourth-order differential equations with a cubic bistable nonlinearity ⋮ Multistability of twisted states in non-locally coupled Kuramoto-type models
Cites Work
- Unnamed Item
- Propagating waves in discrete bistable reaction-diffusion systems
- Chain of coupled bistable oscillators: A model
- Propagation and Its Failure in Coupled Systems of Discrete Excitable Cells
- Cellular neural networks: theory
- Dynamics of Dissipative Structures in Reaction-Diffusion Equations
- DYNAMICS OF LATTICE DIFFERENTIAL EQUATIONS
- SPATIAL DISORDER AND WAVES IN A RING CHAIN OF BISTABLE OSCILLATORS
- SPATIAL DISORDER AND WAVE FRONTS IN A CHAIN OF COUPLED CHUA'S CIRCUITS
- Dynamics in a Discrete Nagumo Equation: Spatial Topological Chaos
This page was built for publication: STABLE STATIONARY SOLUTIONS IN REACTION–DIFFUSION SYSTEMS CONSISTING OF A 1-D ARRAY OF BISTABLE CELLS
