Locally compact subgroup actions on topological groups

Abstract

Let X be a Hausdorff topological group and G a locally compact subgroup of X. We show that X admits a locally finite σ-discrete G-functionally open cover each member of which is G-homeomorphic to a twisted product G×H Si, where H is a compact large subgroup of G (i.e., the quotient G/H is a manifold). If, in addition, the space of connected components of G is compact and X is normal, then X itself is G-homeomorphic to a twisted product G×KS, where K is a maximal compact subgroup of G. This implies that X is K-homeomorphic to the product G/K× S, and in particular, X is homeomorphic to the product Rn× S, where n= dim\, G/K. Using these results we prove the inequality dim\, X dim\, X/G + dim\, G for every Hausdorff topological group X and a locally compact subgroup G of X.