The complexity of prime 3-manifolds and the first mathbb{Z}_{/2mathbb{Z}}-cohomology of small rank
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For a closed orientable connected 3-manifold $M$, its complexity $\boldsymbol{T}(M)$ 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 $\boldsymbol{T}(M)$ in terms of the $\mathbb{Z}_{/2\mathbb{Z}}$-coefficient Thurston norm for $H^1(M;\mathbb{Z}_{/2\mathbb{Z}})$: (1) for any rank-1 subgroup $\{0,\varphi\} \leqslant H^1(M;\mathbb{Z}_{/2\mathbb{Z}})$, we have $\boldsymbol{T}(M) \geqslant 2+2||\varphi||$ unless $M$ is a lens space with $\boldsymbol{T}(M)=1+2||\varphi||$; (2) for any rank-2 subgroup $\{0,\varphi_1,\varphi_2,\varphi_3\} \leqslant H^1(M;\mathbb{Z}_{/2\mathbb{Z}})$, we have $\boldsymbol{T}(M) \geqslant 2+||\varphi_1||+||\varphi_2||+||\varphi_3||$. 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.
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