On critical cardinalities related to Q-sets

Abstract

In this note we collect some known information and prove new results about the small uncountable cardinal q0. The cardinal q0 is defined as the smallest cardinality |A| of a subset A⊂ R which is not a Q-set (a subspace A⊂ R is called a Q-set if each subset B⊂ A is of type Fσ in A). We present a simple proof of a folklore fact that p q0\ b,non( N),( c+)\, and also establish the consistency of a number of strict inequalities between the cardinal q0 and other standard small uncountable cardinals. This is done by combining some known forcing results. A new result of the paper is the consistency of p < lr < q0, where lr denotes the linear refinement number. Another new result is the upper bound q0( I) holding for any q0-flexible cccc σ-ideal I on R.