On Small Separations in Cayley Graphs

Abstract

We present two results on expansion of Cayley graphs. The first result settles a conjecture made by DeVos and Mohar. Specifically, we prove that for any positive constant c there exists a finite connected subset A of the Cayley graph of Z2 such that |∂ A||A|< cdepth(A). This yields that there can be no universal bound for |∂ A|depth(A)|A| for subsets of either infinite or finite vertex transitive graphs. Let X=(V,E) be the Cayley graph of a finitely generated infinite group and A⊂ V finite such that A∂ A is connected. Our second result is that if |A|> 16|∂ A|2 then X has a ring-like structure.