On M-dynamics and Li-Yorke chaos of extensions of minimal dynamics

Abstract

Let πX→Y be an extension of minimal compact metric flows such that Rπ=X. A subflow of Rπ is called an M-flow if it is T.T. and contains a dense set of a.p. points. In this paper we mainly prove the following: (1) π is PI iff X is the unique M-flow containing X in Rπ. (2) If π is not PI, then there exists a canonical Li-Yorke chaotic M-flow in Rπ. In particular, an Ellis weak-mixing non-proximal extension is non-PI and so Li-Yorke chaotic. (3) A unbounded or non-minimal M-flow, not necessarily compact, is sensitive on initial conditions. (4) every syndetically distal flow is pointwise Bohr a.p.