Applications of mutations in the derived categories of weighted projective lines to Lie and quantum algebras

Abstract

Let cohX be the category of coherent sheaves over a weighted projective line X and let Db(cohX) be its bounded derived category. The present paper focuses on the study of the right and left mutation functors arising in Db(cohX) attached to certain line bundles. As applications, we first show that these mutation functors give rise to simple reflections for the Weyl group of the star shaped quiver Q associated with X. By further dealing with the Ringel--Hall algebra of X, we show that these functors provide a realization for Tits' automorphisms of the Kac--Moody algebra gQ associated with Q, as well as for Lusztig's symmetries of the quantum enveloping algebra of gQ.