On regular genus and G-degree of PL 4-manifolds with boundary

Abstract

In this article, we introduce two new PL-invariants: weighted regular genus and weighted G-degree for manifolds with boundary. We first prove two inequalities involving some PL-invariants which state that for any PL-manifold M with non spherical boundary components, the regular genus G(M) of M is at least the weighted regular genus G(M) of M which is again at least the generalized regular genus G(M) of M. Another inequality states that the weighted G-degree DG (M) of M is always greater than or equal to the G-degree DG (M) of M. Let M be any compact connected PL 4-manifold with h number of non spherical boundary components. Then we compute the following: G (M) ≥ 2 (M)+3m+2h-4+2 m and DG (M) ≥ 12(2 (M)+3m+2h-4+2 m), where m and m are the ranks of the fundamental groups of M and the corresponding singular manifold M (obtained by coning off the boundary components of M) respectively. As a consequence we prove that the regular genus G(M) satisfies the following inequality: G (M) ≥ 2 (M)+3m+2h-4+2 m, which improves the previous known lower bounds for the regular genus G(M) of M. Then we define two classes of gems for PL 4-manifold M with boundary: one consists of semi-simple gems and the other consists of weak semi-simple gems, and prove that the lower bounds for the weighted G-degree and weighted regular genus are attained in these two classes respectively.