A Duality in Buchsbaum rings and triangulated manifolds

Abstract

Let be a triangulated homology ball whose boundary complex is ∂. A result of Hochster asserts that the canonical module of the Stanley--Reisner ring of , F[], is isomorphic to the Stanley--Reisner module of the pair (, ∂), F[,∂ ]. This result implies that an Artinian reduction of F[,∂ ] is (up to a shift in grading) isomorphic to the Matlis dual of the corresponding Artinian reduction of F[]. We establish a generalization of this duality to all triangulations of connected orientable homology manifolds with boundary. We also provide an explicit algebraic interpretation of the h"-numbers of Buchsbaum complexes and use it to prove the monotonicity of h"-numbers for pairs of Buchsbaum complexes as well as the unimodality of h"-vectors of barycentric subdivisions of Buchsbaum polyhedral complexes. We close with applications to the algebraic manifold g-conjecture.