English

Three-dimensional normal pseudomanifolds with relatively few edges

Geometric Topology 2020-02-18 v3 Combinatorics

Abstract

Let Δ\Delta be a dd-dimensional normal pseudomanifold, d3.d \ge 3. A relative lower bound for the number of edges in Δ\Delta is that g2g_2 of Δ\Delta is at least g2g_2 of the link of any vertex. When this inequality is sharp Δ\Delta has relatively minimal g2g_2. For example, whenever the one-skeleton of Δ\Delta equals the one-skeleton of the star of a vertex, then Δ\Delta has relatively minimal g2.g_2. Subdividing a facet in such an example also gives a complex with relatively minimal g2.g_2. We prove that in dimension three these are the only examples. As an application we determine the combinatorial and topological type of 33-dimensional Δ\Delta with relatively minimal g2g_2 whenever Δ\Delta 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 Δ\Delta with g2(Δ)2g_2(\Delta) \le 2 are due to Kalai [12] (g2=0)(g_2=0), Nevo and Novinsky [13] (g2=1)(g_2=1) and Zheng [21] (g2=2).(g_2=2). In all three cases Δ\Delta is the boundary of a simplicial polytope. Zheng observed that for all d0d \ge 0 there are triangulations of SdRP2S^d \ast \mathbb{RP}^2 with g2=3.g_2=3. She asked if this is the only nonspherical topology possible for g2(Δ)=3.g_2(\Delta)=3. As another application of relatively minimal g2g_2 we give an affirmative answer when Δ\Delta is 33-dimensional.

Keywords

Cite

@article{arxiv.1803.08942,
  title  = {Three-dimensional normal pseudomanifolds with relatively few edges},
  author = {Biplab Basak and Ed Swartz},
  journal= {arXiv preprint arXiv:1803.08942},
  year   = {2020}
}

Comments

22 pages, 4 figures. To appear in Advances in Mathematics

R2 v1 2026-06-23T01:03:29.666Z