Minimal crystallizations of 3-manifolds with boundary

Abstract

Let (,γ) be a crystallization of connected compact 3-manifold M with h boundary components. Let G(M) and k (M) be the regular genus and gem-complexity of M respectively, and let G(∂ M) be the regular genus of ∂ M. We prove that k (M)≥ 3 (G(M)+h-1) ≥ 3 (G (∂ M)+h-1). These bounds for gem-complexity of M are sharp for several 3-manifolds with boundary. Further, we show that if ∂ M is connected and k (M)< 3 (G (∂ M)+1) then M is a handlebody. In particular, we prove that k (M) =3 G (∂ M) if M is a handlebody and k (M) ≥ 3 (G (∂ M)+1) if M is not a handlebody. Further, we obtain several combinatorial properties for a crystallization of 3-manifolds with boundary.