On partitions of G-spaces and G-lattices

Abstract

Given a G-space X and a non-trivial G-invariant ideal I of subsets of X, we prove that for every partition X=A1… An of X into n 2 pieces there is a piece Ai of the partition and a finite set F⊂ G of cardinality |F| φ(n+1):=1<x<n+1xn+1-x-1x-1 such that G=F· (Ai) where (Ai)=\g∈ G:gAi Ai I\ is the difference set of the set Ai. Also we investigate the growth of the sequence φ(n)=1<x<nxn-x-1x-1 and show that φ(n)=nW(ne)-2n+nW(ne)+W(ne)n+O( nn) where W(x) is the Lambert W-function, defined implicitly as W(x)eW(x)=x. This shows that φ(n) grows faster that any exponent an but slower than the sequence of factorials n!.