Extensions of the Moser-Scherck-Kemperman-Wehn Theorem

Abstract

Let =(V,E) be a reflexive relation having a transitive group of automorphisms and let v∈ V. Let F be a subset of V with F -(v)=\v\. (i) If F is finite, then | (F) F| | (v)|-1. (ii) If F is cofinite, then | (F) F| | - (v)|-1. In particular, let G be group, B be a finite subset of G and let F be a finite or a cofinite subset of G such that F B-1=\1\. Then | (FB) F| |B|-1. The last result (for F finite), is famous Moser-Scherck-Kemperman-Wehn Theorem. Its extension to cofinite subsets seems new. We give also few applications.