Q-spaces, perfect spaces and related cardinal characteristics of the continuum

Abstract

A topological space X is called a Q-space if every subset of X is of type Fσ in X. For i∈\1,2,3\ let qi be the smallest cardinality of a second-countable Ti-space which is not a Q-space. It is clear that q1 q2 q3. For i∈\1,2\ we prove that qi is equal to the smallest cardinality of a second-countable Ti-space which is not perfect. Also we prove that q3 is equal to the smallest cardinality of a submetrizable space, which is not a Q-space. Martin's Axiom implies that qi= c for all i∈\1,2,3\.