($\ell,0)$-Carter partitions, a generating function, and their crystal theoretic interpretation
Abstract
In this paper we give an alternate combinatorial description of the "-JM partitions" (see \cite{F}) that are also -regular. Our main theorem is the equivalence of our combinatoric and the one introduced by James and Mathas (\cite{JM}). The condition of being an -JM partition is fundamentally related to the hook lengths of the partition. The representation-theoretic significance of their combinatoric on an -regular partition is that it indicates the irreducibility of the corresponding specialized Specht module over the finite Hecke algebra (see \cite{JM}). We use our result to find a generating series which counts the number of such partitions, with respect to the statistic of a partition's first part. We then apply our description of these partitions to the crystal graph of the basic representation of , whose nodes are labeled by -regular partitions. Here we give a fairly simple crystal-theoretic rule which generates all -regular -JM partitions in the graph . Finally, we mention how our construction can be generalized to recent results of M. Fayers (see \cite{F}) and S. Lyle (see \cite{L}) to count the total number of (not necessarily -regular) Specht modules which stay irreducible at a primitive th root of unity (for ).
Keywords
Cite
@article{arxiv.0712.2075,
title = {($\ell,0)$-Carter partitions, a generating function, and their crystal theoretic interpretation},
author = {Chris Berg and Monica Vazirani},
journal= {arXiv preprint arXiv:0712.2075},
year = {2011}
}