Dynamics of spiral waves on unbounded domains using center-manifold reductions
Authors
- Sandstede, Björn
- Scheel, Arnd
- Wulff, Claudia
2010 Mathematics Subject Classification
- 35B32 35K57 57S20 57S30
Keywords
- spiral waves, non-compact groups, center manifolds, Hopf bifurcation
DOI
Abstract
An equivariant center-manifold reduction near relative equilibria of G-equivariant semiflows on Banach spaces is presented. In contrast to previous results, the Lie group G is possibly non-compact. Moreover, it is not required that G induces a strongly continuous group action on the underlying function space. In fact, G may act discontinuously. The results are applied to bifurcations of stable patterns arising in reaction-diffusion systems on the plane or in three-space modeling chemical systems such as catalysis on platinum surfaces and Belousov-Zhabotinsky reactions. These systems are equivariant under the Euclidean symmetry group. Hopf bifurcations from rigidly-rotating spiral waves to meandering or drifting waves, and from twisted scroll rings are investigated.
Appeared in
- J. Differential Equations, 141 (1997), pp. 122-149
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