Bricks over preprojective algebras and join-irreducible elements in Coxeter groups

Abstract

A (semi)brick over an algebra A is a module S such that the endomorphism ring EndA(S) is a (product of) division algebra. For each Dynkin diagram , there is a bijection from the Coxeter group W of type to the set of semibricks over the preprojective algebra of type , which is restricted to a bijection from the set of join-irreducible elements of W to the set of bricks over . This paper is devoted to giving an explicit description of these bijections in the case =An or Dn. First, for each join-irreducible element w ∈ W, we describe the corresponding brick S(w) in terms of "Young diagram-like" notation. Next, we determine the canonical join representation w=i=1m wi of an arbitrary element w ∈ W based on Reading's work, and prove that i=1n S(wi) is the semibrick corresponding to w.