Some combinatorial properties of flag simplicial pseudomanifolds and spheres

Abstract

A simplicial complex is called flag if all minimal nonfaces of have at most two elements. The following are proved: First, if is a flag simplicial pseudomanifold of dimension d-1, then the graph of (i) is (2d-2)-vertex-connected and (ii) has a subgraph which is a subdivision of the graph of the d-dimensional cross-polytope. Second, the h-vector of a flag simplicial homology sphere of dimension d-1 is minimized when is the boundary complex of the d-dimensional cross-polytope.