Homology groups of simplicial complements: A new proof of Hochster theorem

Abstract

In this paper, we consider homology groups induced by the exterior algebra generated by a simplicial compliment of a simplicial complex K. These homology groups are isomorphic to the Tor-groups Tori, Jk[m](k(K),k) of the face ring k(K), which is very useful and much studied in toric topology. By using Cech homology theory and Alexander duality theorem, we prove that these homology groups have dualities with the simplicial cohomology groups of the full subcomplexes of K. Then we give a new proof of Hochster's theorem.