Homology cycles in manifolds with locally standard torus actions

Abstract

Let X be a 2n-manifold with a locally standard action of a compact torus Tn. If the free part of action is trivial and proper faces of the orbit space Q are acyclic, then there are three types of homology classes in X: (1) classes of face submanifolds; (2) k-dimensional classes of Q swept by actions of subtori of dimensions <k; (3) relative k-classes of Q modulo ∂ Q swept by actions of subtori of dimensions ≥slant k. The submodule of H*(X) spanned by face classes is an ideal in H*(X) with respect to the intersection product. It is isomorphic to (Z[SQ]/)/W, where Z[SQ] is the face ring of the Buchsbaum simplicial poset SQ dual to Q; is the linear system of parameters determined by the characteristic function; and W is a certain submodule, lying in the socle of Z[SQ]/. Intersections of homology classes different from face submanifolds are described in terms of intersections on Q and Tn.