A note on uniform continuity of monotone functions

Abstract

We prove that it is consistent with ZFC that for every non-decreasing function f:[0,1] [0,1], each subset of [0,1] of cardinality c contains a set of cardinality c on which f is uniformly continuous. We show that this statement follows from the assumptions that d* < c and c is regular, where d*≤ d is the smallest cardinality such that any two disjoint countable dense sets in the Cantor set can be separated by sets each of which is an intersection of at most -many open sets in the Cantor set. We establish also that d*=\ u, d\=\ r, d\, thus giving an alternative proof of the latter equality established by J. Aubrey in 2004.

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