Brauer tree algebras have 2nn 2-tilting complexes

Abstract

We show that any Brauer tree algebra has precisely 2nn 2-tilting complexes, where n is the number of edges of the associated Brauer tree. More explicitly, for an external edge e and an integer j≠0, we show that the number of 2-tilting complexes T with ge(T)=j is 2n-|j|-1n-1, where ge(T) denotes the e-th of the g-vector of T. To prove this, we use a geometric model of Brauer graph algebras on the closed oriented marked surfaces and a classification of 2-tilting complexes due to Adachi-Aihara-Chan.