Weighted hypersurfaces with either assigned volume or many vanishing plurigenera

Abstract

In this paper we construct, for every n, smooth varieties of general type of dimension n with the first n-23 plurigenera equal to zero. Hacon-McKernan, Takayama and Tsuji have recently shown that there are numbers rn such that, for all r > rn, the r-canonical map of every variety of general type of dimension n is birational. Our examples show that rn grows at least quadratically as a function of n. Moreover they show that the minimal volume of a variety of general type of dimension n is smaller than 3n+1(n-1)n. In addition we prove that for every positive rational number q there are smooth varieties of general type with volume q and dimension arbitrarily big.