Counting overweight spaces

Abstract

Let c=2aleph0 denote the cardinality of the continuum and let a,b,k be infinite cardinal numbers with a<b≤ 2a. We show that there exist precisely 2b T0-spaces of size a and weight b up to homeomorphism. Among these non-homeomorphic spaces we track down (1) 2b zero-dimensional, scattered, paracompact, perfectly normal spaces (which are also extremally disconnected in case that b=2a); (2) 2b connected and locally connected Hausdorff spaces; (3) 2b pathwise connected and locally pathwise connected, paracompact, perfectly normal spaces provided that a≥ c; (4) 2b connected, nowhere locally connected, totally pathwise disconnected, paracompact, perfectly normal spaces provided that a≥ c; (5) 2b scattered, compact T1-spaces; (6) 2b connected, locally connected, compact T1-spaces; (7) 2b pathwise connected and scattered, compact T0-spaces; (8) 2b scattered, paracompact Pk-spaces whenever a<k=a and b<k=b and 2b>2a.