Homological Filling Functions with Coefficients

Abstract

How hard is it to fill a loop in a Cayley graph with an unoriented surface? Following a comment of Gromov in "Asymptotic invariants of infinite groups", we define homological filling functions of groups with coefficients in a group R. Our main theorem is that the coefficients make a difference. That is, for every n ≥ 1 and every pair of coefficient groups A, B ∈ \Z,Q\ \Z/pZ : p prime\, there is a group whose filling functions for n-cycles with coefficients in A and B have different asymptotic behavior.