Pseudofinite groups and VC-dimension

Abstract

We develop local NIP group theory in the context of pseudofinite groups. In particular, given a sufficiently saturated pseudofinite structure G expanding a group, and left invariant NIP formula δ(x;y), we prove various aspects of "local fsg" for the right-stratified formula δr(x;y,u):=δ(x· u;y). This includes a δr-type-definable connected component, uniqueness of the pseudofinite counting measure as a left-invariant measure on δr-formulas, and generic compact domination for δr-definable sets.