Cluster integrable systems, q-Painleve equations and their quantization
Abstract
We discuss the relation between the cluster integrable systems and -difference Painlev\'e equations. The Newton polygons corresponding to these integrable systems are all 16 convex polygons with a single interior point. The Painlev\'e dynamics is interpreted as deautonomization of the discrete flows, generated by a sequence of the cluster quiver mutations, supplemented by permutations of quiver vertices. We also define quantum -Painlev\'e systems by quantization of the corresponding cluster variety. We present formal solution of these equations for the case of pure gauge theory using -deformed conformal blocks or 5-dimensional Nekrasov functions. We propose, that quantum cluster structure of the Painlev\'e system provides generalization of the isomonodromy/CFT correspondence for arbitrary central charge.
Cite
@article{arxiv.1711.02063,
title = {Cluster integrable systems, q-Painleve equations and their quantization},
author = {M. Bershtein and P. Gavrylenko and A. Marshakov},
journal= {arXiv preprint arXiv:1711.02063},
year = {2018}
}
Comments
28 pages; v2 30 pages references added, misprints corrected; v3 small changes, references added, to appear in JHEP