Locally standard torus actions and h'-vectors of simplicial posets

Abstract

We consider the orbit type filtration on a manifold X with locally standard action of a compact torus and the corresponding homological spectral sequence (EX)r*,*. If all proper faces of the orbit space Q=X/T are acyclic, and the free part of the action is trivial, this spectral sequence can be described in full. The ranks of diagonal terms are equal to the h'-numbers of the Buchsbaum simplicial poset SQ dual to Q. Betti numbers of X depend only on the orbit space Q but not on the characteristic function. If X is a slightly different object, namely the model space X=(P× Tn)/ where P is a cone over Buchsbaum simplicial poset S, we prove that (EX)∞p,p = h''p(S). This gives a topological evidence for the fact that h''-numbers of Buchsbaum simplicial posets are nonnegative.