Lyapunov-Schmidt Reduction for Unfolding Heteroclinic Networks of Equilibria and Periodic Orbits with Tangencies - Mathematics > Dynamical SystemsReportar como inadecuado




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Abstract: This article concerns arbitrary finite heteroclinic networks in any phasespace dimension whose vertices can be a random mixture of equilibria andperiodic orbits. In addition, tangencies in the intersection of un-stablemanifolds are allowed. The main result is a reduction to algebraic equations ofthe problem to find all solutions that are close to the heteroclinic networkfor all time, and their parameter values. A leading order expansion is given interms of the time spent near vertices and, if applicable, the location on thenon-trivial tangent directions. The only difference between a periodic orbitand an equilibrium is that the time parameter is discrete for a periodic orbit.The essential assumptions are hyperbolicity of the vertices and transversalityof parameters. Using the result, conjugacy to shift dynamics for a generichomoclinic orbit to a periodic orbit is proven. Finally,equilibrium-to-periodic orbit heteroclinic cycles of various types areconsidered.



Autor: Jens D.M. Rademacher

Fuente: https://arxiv.org/



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