An Approach to Cluster Structures on Moduli of Local Systems for General Groups

Abstract

Let S be a surface, G a simply-connected classical group, and G' the associated adjoint form of the group. In FG1, it was shown that the moduli spaces of framed local systems G',S and G,S have the structure of cluster varieties, and thus together form a cluster ensemble, when G had type A. This was extended to classical groups in Le. In this paper we give an algorithm for constructing the cluster structure for general reductive groups G. The algorithm can be carried out under some mild hypotheses, which we explain, and which we believe hold in general. We show that these hypotheses hold when G has type G2, and therefore we are able to construct the cluster structure in this case. We also illustrate our approach by rederiving the cluster structure for G of type A. Our goals are to give some heuristics for the approach taken in Le, point out the difficulties that arise for more general groups, and to record some useful calculations. Forthcoming work by Goncharov and Shen gives a different approach to constructing the cluster structure on G',S and G,S. We hope that some of the ideas here complement their more comprehensive work.