Volume and Self-Intersection of Differences of Two Nef Classes

Abstract

Let \α\ and \β\ be nef cohomology classes of bidegree (1,\,1) on a compact n-dimensional K\"ahler manifold X such that the difference of intersection numbers \α\n - n\,\α\n-1.\,\β\ is positive. We solve in a number of special but rather inclusive cases the quantitative part of Demailly's Transcendental Morse Inequalities Conjecture for this context predicting the lower bound \α\n-n\,\α\n-1.\,\β\ for the volume of the difference class \α-β\. We completely solved the qualitative part in an earlier work. We also give general lower bounds for the volume of \α-β\ and show that the self-intersection number \α-β\n is always bounded below by \α\n-n\,\α\n-1.\,\β\. We also describe and estimate the relative psef and nef thresholds of \α\ with respect to \β\ and relate them to the volume of \α-β\. Finally, broadening the scope beyond the K\"ahler realm, we propose a conjecture relating the balanced and the Gauduchon cones of ∂∂-manifolds which, if proved to hold true, would imply the existence of a balanced metric on any ∂∂-manifold.