Robustly transitive maps with critical points and large dimensional central spaces
Abstract
Given any triplet of positive integers n ≥ 2, m and k such that n=m+k, we exhibit a C1 robustly transitive endomorphism of Tn with persistent critical points in the isotopy class of F × Id, where F is an expanding map of Tm and Id is the identity of Tk. Furthermore, if k is small, the map is not only in the isotopy class but in fact a perturbation of F × Id.
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