Lawrence Ein, Daniel Erman, Robert Lazarsfeld
Published 2015-01-07Version 1
We give a quick new approach to the main cases of the nonvanishing theorems of first and third authors concerning the asymptotic behavior of the syzygies of a projective variety as the positivity of the embedding line bundle grows. Specifically, we present a surprisingly elementary and concrete proof of the asymptotic nonvanishing of Veronese syzygies, and we obtain effective results for arithmetically Cohen-Macaulay varieties. The idea is that one can reduce the statements to some simple computations with monomials.
Asymptotic Syzygies in the Setting of Semi-Ample Growth
Ramification and Discriminants of Vector Bundles and a Quick Proof of Bogomolov's Theorem
Syzygies of projective varieties of large degree: recent progress and open problems
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