Remarks on the second sectional geometric genus of quasi-polarized manifolds and their applications

Abstract

In our previous papers, we investigated a lower bound for the second sectional geometric genus g2(X,L) of n-dimensional polarized manifolds (X,L) and by using these, we studied the dimension of global sections of KX+tL with t≥ 2. In this paper, we consider the case where (X,L) is a quasi-polarized manifold. First we will prove g2(X,L)≥ h1(OX) for the following cases: (a) n=3, (X)=-∞ and (KX+L)≥ 0. (b) n≥ 3 and (X)≥ 0. Moreover, by using this inequality, we will study h0(KX+tL) for the case where (X,L) is a quasi-polarized 3-fold.