Algebraic Geometry Seminar

Title: Logarithmic bounds on Fujita's conjecture
Speaker: Justin Lacini
Speaker Info: University of Kansas
Brief Description:
Special Note:

A longstanding conjecture of T. Fujita asserts that if X is a smooth complex projective variety of dimension n and if L is an ample line bundle, then K_X+mL is basepoint free for m>=n+1. The conjecture is known up to dimension five by work of Reider, Ein, Lazarsfeld, Kawamata, Ye and Zhu. In higher dimensions, breakthrough work of Angehrn, Siu, Helmke and others showed that the conjecture holds if m is larger than a quadratic function in n. We show that for n>=2 the conjecture holds for m larger than n(loglog(n)+3). This is joint work with L. Ghidelli.
Date: Wednesday, April 20, 2022
Time: 3:00pm
Where: Lunt 107
Contact Person: Yuchen Liu
Contact email: yuchenl@northwestern.edu
Contact Phone:
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