Average edge order of normal 3-pseudomanifolds

Abstract

In their work [10], Feng Luo and Richard Stong introduced the concept of the average edge order, denoted as μ0(K). They demonstrated that if μ0(K)≤ 92 for a closed 3-manifold K, then K must be a sphere. Building upon this foundation, Makoto Tamura extended similar results to 3-manifolds with non-empty boundaries in [12,13]. In our present study, we extend these findings to normal 3-pseudomanifolds. Specifically, we establish that for a normal 3-pseudomanifold K with singularities, μ0(K)≥307. Moreover, equality holds if and only if K is a one-vertex suspension of a triangulation of RP2 with seven vertices. Furthermore, we establish that when 307≤μ0(K)≤92, the 3-pseudomanifold K can be derived from some boundary complexes of 4-simplices by a sequence of possible operations, including connected sums, bistellar 1-moves, edge contractions, edge expansions, vertex folding, and edge folding.