Difference between revisions of "Algebra and Algebraic Geometry Seminar Spring 2020"
(→Spring 2020 Schedule)
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|Erika Ordog (Duke)
|Erika Ordog (Duke)
Revision as of 08:01, 8 February 2020
Spring 2020 Schedule
|January 24||Xi Chen (Alberta)||Rational Curves on K3 Surfaces||Michael K|
|January 31||Janina Letz (Utah)||Local to global principles for generation time over commutative rings||Daniel and Michael B|
|February 7||Jonathan Montaño (New Mexico State)||Asymptotic behavior of invariants of symbolic powers||Daniel|
|February 21||Erika Ordog (Duke)||Minimal resolutions of monomial ideals||Daniel|
|March 13||Kevin Tucker (UIC)||TBD||Daniel|
|March 27||Patrick McFaddin (Fordham)||TBD||Michael B|
|April 10||Ruijie Yang (Stony Brook)||TBD||Michael K|
|April 17||Remy van Dobben de Bruyn (Princeton/IAS)||TBD||Botong|
|April 24||Katrina Honigs (University of Oregon)||TBA||Andrei|
|May 1||Lazarsfeld Distinguished Lectures|
Rational Curves on K3 Surfaces
It is conjectured that there are infinitely many rational curves on every projective K3 surface. A large part of this conjecture was proved by Jun Li and Christian Liedtke, based on the characteristic p reduction method proposed by Bogomolov-Hassett-Tschinkel. They proved that there are infinitely many rational curves on every projective K3 surface of odd Picard rank. Over complex numbers, there are a few remaining cases: K3 surfaces of Picard rank two excluding elliptic K3's and K3's with infinite automorphism groups and K3 surfaces with two particular Picard lattices of rank four. We have settled these leftover cases and also generalized the conjecture to the existence of curves of high genus. This is a joint work with Frank Gounelas and Christian Liedtke.
Local to global principles for generation time over commutative rings
Abstract: In the derived category of modules over a commutative noetherian ring a complex $G$ is said to generate a complex $X$ if the latter can be obtained from the former by taking finitely many summands and cones. The number of cones needed in this process is the generation time of $X$. In this talk I will present some local to global type results for computing this invariant, and also discuss some applications of these results.
Asymptotic behavior of invariants of symbolic powers
Abstract: The symbolic powers of an ideal is a filtration that encodes important algebraic and geometric information of the ideal and the variety it defines. Despite the importance and great results about symbolic powers, their complete structure is far from being understood. For example, we do not completely understand yet the behavior of the number of generators, regularities, and depths of these ideals. In this talk I will report on resent results in this direction in joint works with Hailong Dao and Luis Núñez-Betancourt.