Prime Representations from a Homological Perspective
Abstract
We begin the study of simple finite-dimensional prime representations of quantum affine algebras from a homological perspective. Namely, we explore the relation between self extensions of simple representations and the property of being prime. We show that every nontrivial simple module has a nontrivial self extension. Conversely, if a simple representation has a unique nontrivial self extension up to isomorphism, then its Drinfeld polynomial is a power of the Drinfeld polynomial of a prime representation. It turns out that, in the sl(2) case, a simple module is prime if and only if it has a unique nontrivial self extension up to isomorphism. It is tempting to conjecture that this is true in general and we present a large class of prime representations satisfying this homological property.
Cite
@article{arxiv.1112.6376,
title = {Prime Representations from a Homological Perspective},
author = {Vyjayanthi Chari and Adriano Moura and Charles Young},
journal= {arXiv preprint arXiv:1112.6376},
year = {2011}
}