A lower bound for KXL of quasi-polarized surfaces (X,L) with non-negative Kodaira dimension
Abstract
Let X be a smooth projective surface over the complex number field and let L be a nef-big divisor on X. Here we consider the following conjecture; If the Kodaira dimension (X)≥ 0, then KXL≥ 2q(X)-4, where q(X) is the irregularity of X. In this paper, we prove that this conjecture is true if (1) the case in which (X)=0 or 1, (2) the case in which (X)=2 and h0(L)≥ 2, or (3) the case in which (X)=2, X is minimal, h0(L)=1, and L satisfies some conditions.
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