σ-Continuous functions and related cardinal characteristics of the continuum

Abstract

A function f:X Y between topological spaces is called σ-continuous (resp. σ-continuous) if there exists a (closed) cover \Xn\n∈ω of X such that for every n∈ω the restriction fXn is continuous. By cσ (resp. cσ) we denote the largest cardinal c such that every function f:X R defined on a subset X⊂ R of cardinality |X|< is σ-continuous (resp. σ-continuous). It is clear that ω1 cσ cσ c. We prove that p q0= cσ=\ cσ, b, q\ cσ\non( M),non( N)\. The equality cσ= q0 resolves a problem from the initial version of the paper.