Isoperimetric stability in lattices

Abstract

We obtain isoperimetric stability theorems for general Cayley digraphs on Zd. For any fixed B that generates Zd over Z, we characterise the approximate structure of large sets A that are approximately isoperimetric in the Cayley digraph of B: we show that A must be close to a set of the form kZ Zd, where for the vertex boundary Z is the conical hull of B, and for the edge boundary Z is the zonotope generated by B.