Dp-minimal profinite groups and valuations on the integers

Abstract

We study dp-minimal infinite profinite groups that are equipped with a uniformly definable fundamental system of open subgroups. We show that these groups have an open subgroup A such that either A is a direct product of countably many copies of Fp for some prime p, or A is of the form A Πp Zpαp × Ap where αp < ω and Ap is a finite abelian p-group for each prime p. Moreover, we show that if A is of this form, then there is a fundamental system of open subgroups such that the expansion of A by this family of subgroups is dp-minimal. Our main ingredient is a quantifier elimination result for a class of valued abelian groups. We also apply it to (Z,+) and we show that if we expand (Z,+) by any chain of subgroups (Bi)i<ω, we obtain a dp-minimal structure. This structure is distal if and only if the size of the quotients Bi/Bi+1 is bounded.