Shy shadows of infinite-dimensional partially hyperbolic invariant sets

Abstract

Let R be a strongly compact C2 map defined in an open subset of an infinite-dimensional Banach space such that the image of its derivative DF R is dense for every F. Let be a compact, forward invariant and partially hyperbolic set of R such that R → is onto. The δ-shadow Wsδ() of is the union of the sets Wsδ(G)= \F dist(RiF, RiG) ≤ δ, \ for \ every \ i≥ 0 \, where G ∈ . Suppose that Wsδ() has transversal empty interior, that is, for every C1+Lip n-dimensional manifold M transversal to the distribution of dominated directions of and sufficiently close to Wsδ() we have that M Wsδ() has empty interior in M. Here n is the finite dimension of the strong unstable direction. We show that if δ' is small enough then i≥ 0R-iWsδ' () intercepts a Ck-generic finite dimensional curve inside the Banach space in a set of parameters with zero Lebesgue measure, for every k≥ 0. This extends to infinite-dimensional dynamical systems previous studies on the Lebesgue measure of stable laminations of invariants sets.