The complexity of prime 3-manifolds and the first Z/2Z-cohomology of small rank

Abstract

For a closed orientable connected 3-manifold M, its complexity T(M) is defined to be the minimal number of tetrahedra in its triangulations. Under the assumption that M is prime (but not necessarily atoroidal), we establish a lower bound for the complexity T(M) in terms of the Z/2Z-coefficient Thurston norm for H1(M;Z/2Z): (1) for any rank-1 subgroup \0,\ ≤slant H1(M;Z/2Z), we have T(M) ≥slant 2+2|||| unless M is a lens space with T(M)=1+2||||; (2) for any rank-2 subgroup \0,1,2,3\ ≤slant H1(M;Z/2Z), we have T(M) ≥slant 2+||1||+||2||+||3||. Under the extra assumption that M is atoroidal, these inequalities had already been shown by Jaco, Rubinstein, and Tillmann. Our work here shows that we do not need to require M to be atoroidal.