Crystallizations of small covers over the n-simplex n and the prism n-1 × I

Abstract

A crystallization of a PL manifold is an edge-colored graph that corresponds to a contracted triangulation of the manifold, facilitating the study of its topological and combinatorial properties. A small cover over a simple convex n-polytope Pn is a closed n-manifold with a locally standard Z2n-action such that its orbit space is homeomorphic to Pn. In this article, we study the crystallizations of small covers over the n-simplex n and the prism n-1 × I. It is known that the small cover over the n-simplex n is RPn. For every n≥ 2, we prove that RPn has a unique 2n-vertex crystallization. We also demonstrate that there are exactly 1 + 2n-1 D-J equivalence classes of small covers over the prism n-1 × I, where n≥ 3. For each Z2-characteristic function of n-1 × I, we construct a 2n-1(n+1)-vertex crystallization of the small cover Mn(λ) with regular genus 1 + 2n-4(n2 - 2n - 3), where n≥ 4. The regular genus of closed PL \(n\)-manifolds extends the notions of the genus of surfaces and the Heegaard genus of 3-manifolds to higher dimensions. In this article, we construct four orientable and four non-orientable RP3-bundles over S1 up to D-J equivalence, each with regular genus 6. Although the four orientable (resp. non-orientable) small covers are not D-J equivalent, we show that they are PL homeomorphic.