Partition Identities and Quiver Representations
Combinatorics
2018-02-05 v1
Abstract
We present a particular connection between classical partition combinatorics and the theory of quiver representations. Specifically, we give a bijective proof of an analogue of A. L. Cauchy's Durfee square identity to multipartitions. We then use this result to give a new proof of M. Reineke's identity in the case of quivers of Dynkin type of arbitrary orientation. Our identity is stated in terms of the lacing diagrams of S. Abeasis - A. Del Fra, which parameterize orbits of the representation space of for a fixed dimension vector.
Cite
@article{arxiv.1608.02030,
title = {Partition Identities and Quiver Representations},
author = {Richard Rimanyi and Anna Weigandt and Alexander Yong},
journal= {arXiv preprint arXiv:1608.02030},
year = {2018}
}
Comments
26 pages