Some topological properties of spaces between the Sorgenfrey and usual topologies on real number

Abstract

The H-space, denoted as (R, τA), has R as its point set and a basis consisting of usual open interval neighborhood at points of A while taking Sorgenfrey neighborhoods at points of R-A. In this paper, we mainly discuss some topological properties of H-spaces. In particular, we prove that, for any subset A⊂ R, (1) (R, τA) is zero-dimensional iff R A is dense in (R, τE); (2) (R, τA) is locally compact iff (R, τA) is a kω-space; (3) if (R, τA) is σ-compact, then R A is countable and nowhere dense; if R A is countable and scattered, then (R, τA) is σ-compact; (4) (R, τA)0 is perfectly subparacompact; (5) there exists a subset A⊂R such that (R, τA) is not quasi-metrizable; (6) (R, τA) is metrizable if and only if (R, τA) is a β-space.