An algorithmic approach to construct crystallizations of 3-manifolds from presentations of fundamental groups

Abstract

We have defined weight of the pair ( S R , R) for a given presentation S R of a group, where the number of generators is equal to the number of relations. We present an algorithm to construct crystallizations of 3-manifolds whose fundamental group has a presentation with two generators and two relations. If the weight of ( S R , R) is n then our algorithm constructs all the n-vertex crystallizations which yield ( S R , R). As an application, we have constructed some new crystallizations of 3-manifolds. We have generalized our algorithm for presentations with three generators and certain class of relations. For m≥ 3 and m ≥ n ≥ k ≥ 2, our generalized algorithm gives a 2(2m+2n+2k-6+δn2 + δk2)-vertex crystallization of the closed connected orientable 3-manifold M m,n,k having fundamental group x1,x2,x3 x1m=x2n=x3k=x1x2x3 . These crystallizations are minimal and unique with respect to the given presentations. If `n=2' or `k≥ 3 and m ≥ 4' then our crystallization of M m,n,k is vertex-minimal for all the known cases.