Okamoto's symmetry on the representation space of the sixth Painlevé equation

Abstract

The sixth Painlevé equation (PVI) admits dual isomonodromy representations of type 2-dimensional Fuchsian and 3-dimensional Birkhoff. Taking the multiplicative middle convolution of a Teichmüller X-coordinatization for the Fuchsian monodromy group, we give Okamoto's symmetry w2 of PVI a monodromic realization in the language of cluster X-mutations. The explicit mutation formula is encoded in dual geometric terms of colored equilateral triangulations and star-shaped fat graphs. Moreover, this realization has a known additive analogue through the middle convolution for Fuchsian systems, and dual formulations for both the Birkhoff representation and its Stokes data exist. We give this quadruple of maps, each one realizing w2, a unified diagrammatic description in purely convolutional terms.