Time: Tuesday, Apirl 30th, 2024 , 15:00-16:00
Location:R101, Teaching Center
Speaker: Yeqin Liu (UIC)
Abstract: Vector bundles E with Hom*(E, E)=C are called exceptional, and they play an important role in the study of derived categories and stable sheaves. Unlike P^1 and P^2, classifying exceptional bundles on P^3 is a challenging problem. In this talk we introduce new techniques to approach this problem, by studying stable spherical bundles on quartic surfaces. We show the first nonexistence results: there is no exceptional bundle on P^3 with degree d and maximal possible rank 2d^2+1 when |d|>3. We will also discuss many future developments on this program.
Abstract: Vector bundles E with Hom*(E, E)=C are called exceptional, and they play an important role in the study of derived categories and stable sheaves. Unlike P^1 and P^2, classifying exceptional bundles on P^3 is a challenging problem. In this talk we introduce new techniques to approach this problem, by studying stable spherical bundles on quartic surfaces. We show the first nonexistence results: there is no exceptional bundle on P^3 with degree d and maximal possible rank 2d^2+1 when |d|>3. We will also discuss many future developments on this program.