Binomial rings, and integral homology of complements of compact toric arrangements

Abstract

An affine subtorus of the compact torus T=(S1)n is a translated copy of a Lie subgroup. Given a finite collection T1,…, Tk of such subtori, and a prime p, we describe an explicit chain complex that calculates the group H*(T-i=1k Ti,Z(p)). %The complex is determined by the integral homology maps induced by the inclusions TJ⊂ TI where I⊂ J⊂\1,…, k\ and TI denotes i∈ I Ti. Our main tool is the binomial models for spaces constructed by T.~Ekedahl. We use these results to express the groups H*(T-i=1k Ti,Z). We also show that the Mayer-Vietoris spectral sequence that converges to the homology of T-i=1k Ti collapses at the second page rationally, and also integrally under some assumptions on the arrangement T1,…, Tk, with all extension problems being trivial in the latter case.