Singular robustly chain transitive sets are singular volume partial hyperbolic

Abstract

For diffeomorphisms or for non-singular flows, there are many results relating properties persistent under C1 perturbations and global structures for the dynamics ( such as hyperbolicity, partial hyperbolicity, dominated splitting). However, a dif\'iculty appears when a robust property of a flow holds on a set containing recurrent orbits accumulating a singular point. In [BdL] with Christan Bonatti we propose a a general procedure for adapting the usual hyperbolic structures to the singularities. In this paper, using this tool, we recover the results in [BDP] for flows, showing that robustly chain transitive sets have a weak form of hyperbolicity. allowing us to conclude as well the kind of hyperbolicity carried by the examples in BLY (a robust chain transitive singular attractor with periodic orbits of different indexes). Along with the results in [BdL], this shows that the way we propose to interpret the effect of singularities has the potential to adapt to other settings in which there is a coexistence of singularities and regular orbits with the goal of re-obtaining the results that we already know for diffeomorphisms.