Classification and stability of simple homoclinic cycles in R5

Abstract

The paper presents a complete study of simple homoclinic cycles in R5. We find all symmetry groups Gamma such that a Gamma-equivariant dynamical system in R5 can possess a simple homoclinic cycle. We introduce a classification of simple homoclinic cycles in Rn based on the action of the system symmetry group. For systems in R5, we list all classes of simple homoclinic cycles. For each class, we derive necessary and sufficient conditions for asymptotic stability and fragmentary asymptotic stability in terms of eigenvalues of linearisation near the steady state involved in the cycle. For any action of the groups Gamma which can give rise to a simple homoclinic cycle, we list classes to which the respective homoclinic cycles belong, thus determining conditions for asymptotic stability of these cycles.