Limit cycles for a class of Z2n-equivariant systems without infinite equilibria
Abstract
We analyze the dynamics of a class of Z2n-equivariant differential equations on the plane, depending on 4 real parameters. This study is the generalisation to Z2n of previous works with Z4 and Z6 symmetry. We reduce the problem of finding limit cycles to an Abel equation, and provide criteria for proving in some cases uniqueness and hyperbolicity of the limit cycle that surrounds either 1, 2n+1 or 4n+1 equilibria, the origin being always one of these points.
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