Congruence of ultrafilters

Abstract

We continue the research of the relation 1mm1mm on the set β N of ultrafilters on N, defined as an extension of the divisibility relation. It is a quasiorder, so we see it as an order on the set of =-equivalence classes, where F= G means that F and G are mutually 1mm1mm-divisible. Here we introduce a new tool: a relation of congruence modulo an ultrafilter. We first recall the congruence of ultrafilters modulo an integer and show that =-equivalent ultrafilters do not necessarily have the same residue modulo m∈ N. Then we generalize this relation to congruence modulo an ultrafilter in a natural way. After that, using iterated nonstandard extensions, we introduce a stronger relation, which has nicer properties with respect to addition and multiplication of ultrafilters. Finally, we also introduce a strengthening of 1mm1mm and show that it also behaves well in relation to the congruence relation.