Minimal crystallizations of 3-manifolds

Abstract

We have introduced the weight of a group which has a presentation with number of relations is at most the number of generators. We have shown that the number of facets of any contracted pseudotriangulation of a connected closed 3-manifold M is at least the weight of π(M, ). This lower bound is sharp for the 3-manifolds R P3, L(3,1), L(5,2), S1× S1 × S1, S2 × S1, S2 × -2.8mm- S1 and S3/Q8, where Q8 is the quaternion group. Moreover, there is a unique such facet minimal pseudotriangulation in each of these seven cases. We have also constructed contracted pseudotriangulations of L(kq-1,q) with 4(q+k-1) facets for q ≥ 3, k ≥ 2 and L(kq+1,q) with 4(q+k) facets for q≥ 4, k≥ 1. By a recent result of Swartz, our pseudotriangulations of L(kq+1, q) are facet minimal when kq+1 are even. In 1979, Gagliardi found presentations of the fundamental group of a manifold M in terms of a contracted pseudotriangulation of M. Our construction is the converse of this, namely, given a presentation of the fundamental group of a 3-manifold M, we construct a contracted pseudotriangulation of M. So, our construction of a contracted pseudotriangulation of a 3-manifold M is based on a presentation of the fundamental group of M and it is computer-free.