Generalized Clifford-Severi Inequality and the Volume of Irregular Varieties

Abstract

We give a sharp lower bound for the selfintersection of a nef line bundle L on an irregular variety X in terms of its continuous global sections and the Albanese dimension of X, which we call the Generalized Clifford-Severi inequality. We also extend the result to nef vector bundles and give a slope inequality for fibred irregular varieties. As a byproduct we obtain a lower bound for the volume of irregular varieties; when X is of maximal Albanese dimension the bound is Vol(X) ≥ 2 n! ωX and it is sharp.