Schurian-finiteness of blocks of type A Hecke algebras II

Abstract

For any algebra A over an algebraically closed field F, we say that an A-module M is Schurian if EndA(M) F. We say that A is Schurian-finite if there are only finitely many isomorphism classes of Schurian A-modules, and Schurian-infinite otherwise. In this paper, we build on the work of Ariki and the second author to show that all blocks of type A Hecke algebras of weight at least 2 in quantum characteristic e ≥ 3 are Schurian-infinite. This proves that if e ≥ 3 then blocks of type A Hecke algebras are Schurian-finite if and only if they are representation-finite.