Three-dimensional normal pseudomanifolds with relatively few edges

Abstract

Let be a d-dimensional normal pseudomanifold, d 3. A relative lower bound for the number of edges in is that g2 of is at least g2 of the link of any vertex. When this inequality is sharp has relatively minimal g2. For example, whenever the one-skeleton of equals the one-skeleton of the star of a vertex, then has relatively minimal g2. Subdividing a facet in such an example also gives a complex with relatively minimal g2. We prove that in dimension three these are the only examples. As an application we determine the combinatorial and topological type of 3-dimensional with relatively minimal g2 whenever has two or fewer singularities. The topological type of any such complex is a pseudocompression body, a pseudomanifold version of a compression body. Complete combinatorial descriptions of with g2() 2 are due to Kalai [12] (g2=0), Nevo and Novinsky [13] (g2=1) and Zheng [21] (g2=2). In all three cases is the boundary of a simplicial polytope. Zheng observed that for all d 0 there are triangulations of Sd RP2 with g2=3. She asked if this is the only nonspherical topology possible for g2()=3. As another application of relatively minimal g2 we give an affirmative answer when is 3-dimensional.