Regular genus of S2 × S1 × S1, 4-torus, and small covers over 2 × 2

Abstract

A crystallization of a PL manifold is an edge-colored graph encoding a contracted triangulation of the manifold. The concept of regular genus generalizes the notions of surface genus and Heegaard genus for 3-manifolds to higher-dimensional closed PL manifolds. The regular genus of a PL manifold is a PL invariant. Determining the regular genus of a closed PL n-manifold remains a fundamental challenge in combinatorial topology. In this article, we first resolve a conjecture by proving that the regular genus of S2 × S1 × S1 is 6. Additionally, we determine that the regular genus of S1 × S1 × S1 × S1 is 16. We also present some observations related to the regular genus of the n-dimensional torus and conjecture that the regular genus of S1 × S1 × ·s × S1 (n times) is 1+(n+1)! \ (n-3)8, for n 5. Then, we investigate the regular genus of small covers. Small covers are closed n-manifolds admitting a locally standard Z2n-action with orbit space homeomorphic to a simple convex polytope Pn. For the polytope P = 2 × 2, we classify all the small covers up to Davis-Januszkiewicz (D-J) equivalence and show that there are exactly seven such covers. Among these, one is RP2 × RP2, while the others are RP2-bundles over RP2. Remarkably, each of these seven small covers has the regular genus 8. Results in this article provide explicit regular genus values for several important 4-manifolds, offering new insights and tools for future work in combinatorial topology.