Lower bounds for regular genus and gem-complexity of PL 4-manifolds with boundary

Abstract

Let M be a connected compact PL 4-manifold with boundary. In this article, we have given several lower bounds for regular genus and gem-complexity of the manifold M. In particular, we have proved that if M is a connected compact 4-manifold with h boundary components then its gem-complexity k(M) satisfies the following inequalities: k(M)≥ 3(M)+7m+7h-10 and k(M)≥ k(∂ M)+3(M)+4m+6h-9, and its regular genus G(M) satisfies the following inequalities: G(M)≥ 2(M)+3m+2h-4 and G(M)≥ G(∂ M)+2(M)+2m+2h-4, where m is the rank of the fundamental group of the manifold M. These lower bounds enable to strictly improve previously known estimations for regular genus and gem-complexity of a PL 4-manifold with boundary. Further, the sharpness of these bounds has also been shown for a large class of PL 4-manifolds with boundary.