On the indices of periodic points in C¹-generic wild homoclinic classes in dimension three
classification
🧮 math.DS
keywords
homoclinicperiodicclassescontainsdimensionpointthreeabsence
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We study the dynamics of homoclinic classes on three dimensional manifolds under the robust absence of dominated splittings. We prove that if such a homoclinic class contains a volume-expanding periodic point, then, $C^1$-generically, it contains a hyperbolic periodic point whose index (dimension of the unstable manifold) is equal to two.
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