On explicit birational geometry for minimal n-folds of canonical dimension n-1

Abstract

Let n≥ 2 be any integer. We study the optimal lower bound vn, n-i of the canonical volume and the optimal upper bound rn,n-i of the canonical stability index for minimal projective n-folds of general type, which are canonically fibered by i-folds (i=0,1). The results for i = 0, vn,n=2 and rn, n=n+2, are known to experts. In this article, we show that vn,n-1=62n+(n 3) and rn,n-1=13(5n+ 3 + (n 3)). The machinery is applicable to all canonical dimensions n-i.