Solutions of Fixed Period in the Nonlinear Wave Equation on Networks
Abstract
The wave equation on network is defined by ∂ttu=Gu+g(u), where u∈Rn and the graph Laplacian G is an operator on functions on n vertices. We suppose that g:Rn→ Rn is an odd continuous function that satisfies g(0)=g (0)=0 and the Nagumo condition. Assuming that the graph is invariant by a subgroup of permutations , using a -equivariant topological invariant we prove the existence of multiple non-constant p-periodic solutions characterized by their symmetries.
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