Riemann-Hilbert correspondence for Painlevé 5 and nonlinear monodromy-Stokes structure

Abstract: Under a generic condition we capture all the solutions of Painlev\'e 5 equation in a right half plane near the point at infinity, that is, we show that, by the Riemann-Hilbert correspondence, classified collections of asymptotic solutions may be labelled with monodromy data filling up the whole monodromy manifold. To do so, in addition to the asymptotics by Andreev and Kitaev along the positive real axis, we deal with elliptic asymptotics and truncated solutions arising from a family of solutions along the imaginary axes. To know analytic continuations outside this region we propose a formulation of nonlinear monodromy-Stokes structure based on the monodromy data, which provides an expression of nonlinear monodromy actions on the character variety.