Maria Jesus Álvarez, Isabel Salgado Labouriau, Adrian Calin Murza
Published 2013-09-20, updated 2014-10-29Version 4
We analyze the dynamics of a 4-parameter family of planar ordinary differential equations, given by a polynomial of degree 5 that is equivariant under a symmetry of order 6. We obtain the number of limit cycles as a function of the parameters, and provide criteria for proving in some cases uniqueness and hyperbolicity of the limit cycle surrounding either 1, 7 or 13 critical points, the origin being always one of these points. The method used is the reduction of the problem to an Abel equation.
Limit cycles for a class of eleventh $\mathbb{Z}_{12}-$equivariant systems without infinite critical points
Limit cycles for a class of $\mathbb{Z}_{2n}-$equivariant systems without infinite equilibria
Multiplicity of limit cycles that appear after perturbations of hyperbolic polycycles
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