R-closedness and Upper semicontinuity

Abstract

Let F be a pointwise almost periodic decomposition of a compact metrizable space X. Then F is R-closed if and only if F is usc. Moreover, if there is a finite index normal subgroup H of an R-closed flow G on a compact manifold such that the orbit closures of H consist of codimension k compact connected elements and "few singularities" for k = 1 or 2, then the orbit class space of G is a compact k-dimensional manifold with conners. In addition, let v be a nontrivial R-closed vector field on a connected compact 3-manifold M. Then one of the following holds: 1) The orbit class space M/ v is [0,1] or S1 and each interior point of M/ v is two dimensional. 2) Per(v) is open dense and M = Sing(v) Per(v). 3) There is a nontrivial non-toral minimal set. On the other hand, let G be a flow on a compact metrizable space and H a finite index normal subgroup. Then we show that G is R-closed if and only if so is H.