On Finiteness of Homological Isoperimetric Functions on Top Dimensions

Abstract

We address a question from BKV25 regarding the finiteness of the homological R-isoperimetric function. Let R be a subfield of the complex numbers C with the absolute value norm. We prove that for any group G that admits a finite (n+1)-dimensional model for K(G,1), the homological n-isoperimetric function of G over R is either linear or takes infinite values. In particular, by results of Gersten and Mineyev, in the class of groups admitting a finite 2-dimensional classifying space, the homological 1-dimensional isoperimetric function over R only captures hyperbolicity. This follows as a particular case of a more general result proved in this note.