Graded Brauer Tree Algebras

Abstract

In this paper we construct non-negative gradings on a basic Brauer tree algebra A corresponding to an arbitrary Brauer tree of type (m,e). We do this by transferring gradings via derived equivalence from a basic Brauer tree algebra AS, whose tree is a star with the exceptional vertex in the middle, to A. The grading on AS comes from the tight grading given by the radical filtration. To transfer gradings via derived equivalence we use tilting complexes constructed by taking Green's walk around (cf. [Zak]). By computing endomorphism rings of these tilting complexes we get graded algebras. We also compute OutK(A), the group of outer automorphisms that fix isomorphism classes of simple A-modules, where is an arbitrary Brauer tree, and we prove that there is unique grading on A up to graded Morita equivalence and rescaling.