Generic properties of vector fields identical on a compact set and codimension one partially hyperbolic dynamics

Abstract

Let Xr(M) be the set of Cr vector fields on a boundaryless compact Riemannian manifold M. Given a vector field X0∈Xr(M) and a compact invariant set of X0, we consider the closed subset Xr(M,) of Xr(M), consisting of all Cr vector fields which coincide with X0 on . Study of such a set naturally arises when one needs to perturb a system while keeping part of the dynamics untouched. A vector field X∈Xr(M,) is called -avoiding Kupka-Smale, if the dynamics away from is Kupka-Smale. We show that a generic vector field in Xr(M,) is -avoiding Kupka-Smale. In the C1 topology, we obtain more generic properties for X1(M,). With these results, we further study codimension one partially hyperbolic dynamics for generic vector fields in X1(M,), giving a dichotomy of hyperbolicity and Newhouse phenomenon. As an application, we obtain that C1 generically in X1(M), a non-trivial Lyapunov stable chain recurrence class of a singularity which admits a codimension 2 partially hyperbolic splitting with respect to the tangent flow is a homoclinic class.

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