Separation profiles, isoperimetry, growth and compression

Abstract

We give lower and upper bounds for the separation profile (introduced by Benjamini, Schramm & Tim\'ar) for various graphs using the isoperimetric profile, growth and Hilbertian compression. For graphs which have polynomial isoperimetry and growth, we show that the separation profile Sep(n) is also bounded by powers of n. For many amenable groups, we show a lower bound in n/ (n)a and, for any group which has a non-trivial compression exponent in an Lp-space, an upper bound in n/ (n)b. We show that solvable groups of exponential growth cannot have a separation profile bounded above by a sublinear power function. In an appendix, we introduce the notion of local separation, with applications for percolation clusters of Zd and graphs which have polynomial isoperimetry and growth.