Self-divisible ultrafilters and congruences in βZ

Abstract

We introduce self-divisible ultrafilters, which we prove to be precisely those w such that the weak congruence relation w introduced by Sobot is an equivalence relation on βZ. We provide several examples and additional characterisations; notably we show that w is self-divisible if and only if w coincides with the strong congruence relation sw, if and only if the quotient (βZ,)/sw is a profinite group. We also construct an ultrafilter w such that w fails to be symmetric, and describe the interaction between the aforementioned quotient and the profinite completion Z of the integers.