On semi-openness of fiber-onto extensions of minimal semiflows and quasi-separable maps

Abstract

The purpose of this paper is to find conditions for a continuous onto map φ X→ Y and its induced map φ*1(X)→M1(Y) to be semi-open, where X, Y are compact Hausdorff spaces and M1(X), M1(Y) are their Borel probability spaces. For that, we mainly prove the following results by using the structure theory of extensions of semiflows and inverse limit techniques: (1) If φ is an extension of minimal flows, then φ* is semi-open. (2) If φ is a quasi-separable fiber-onto extension of minimal semiflows, then φ and φ* are semi-open. (3) If Y is metrizable, then φ is semi-open if and only if φ* is semi-open. In addition, if X,Y are left-topological groups, X is Lindel\"of quasi-regular, Y is Baire and if φ is a locally closed continuous onto equivariant mapping, then φ is semi-open (This is a generalization of Pontryagin's open-mapping theorem).