On 2-dimensional expanding attractors of A-flows

Abstract

We prove that given any closed n-manifold Mn, n≥ 4, there is an A-flow ft on Mn such that the non-wandering set NW(ft) consists of 2-dimensional expanding attractor (the both, orientable and non-orientable) and trivial basic sets. For 3-manifolds, we prove that given any closed 3-manifold M3, there is an A-flow ft on M3 such that the non-wandering set NW(ft) consists of a non-orientable 2-dimensional expanding attractor and trivial basic sets. Moreover, there is a nonsingular A-flow ft on a 3-sphere such that the non-wandering set NW(ft) consists of an orientable 2-dimensional expanding attractor and trivial basic sets (isolated periodic trajectories).