Crystal rules for (,0)-JM partitions

Abstract

Vazirani and the author BV gave a new interpretation of what we called -partitions, also known as (,0)-Carter partitions. The primary interpretation of such a partition λ is that it corresponds to a Specht module Sλ which remains irreducible over the finite Hecke algebra Hn(q) when q is specialized to a primitive th root of unity. To accomplish this we relied heavily on the description of such a partition in terms of its hook lengths, a condition provided by James and Mathas. In this paper, I use a new description of the crystal reg which helps extend previous results to all (,0)-JM partitions (similar to (,0)-Carter partitions, but not necessarily -regular), by using an analogous condition for hook lengths which was proven by work of Lyle and Fayers.