Painlev\'e-III Monodromy Maps Under the D6 D8 Confluence and Applications to the Large-Parameter Asymptotics of Rational Solutions

Abstract

The third Painlev\'e equation in its generic form, often referred to as Painlev\'e-III(D6), is given by d2u dx2 =1u( du dx)2-1x du dx+α u2+βx+4u3-4u, α,β ∈ C. Starting from a generic initial solution u0(x) corresponding to parameters α, β, denoted as the triple (u0(x),α,β), we apply an explicit B\"acklund transformation to generate a family of solutions (un(x),α+4n,β+4n) indexed by n ∈ N. We study the large n behavior of the solutions (un(x),α+4n,β+4n) under the scaling x=z/n in two different ways: (a) analyzing the convergence properties of series solutions to the equation, and (b) using a Riemann-Hilbert representation of the solution un(z/n). Our main result is a proof that the limit of solutions un(z/n) exists and is given by a solution of the degenerate Painlev\'e-III equation, known as Painlev\'e-III(D8), d2U dz2 =1U( dU dz)2-1z dU dz+4U2+4z. A notable application of our result is to rational solutions of Painlev\'e-III(D6), which are constructed using the seed solution (1,4m,-4m) where m ∈ C ( Z +12) and can be written as a particular ratio of Umemura polynomials. We identify the limiting solution in terms of both its initial condition at z=0 when it is well defined, and by its monodromy data in the general case. Furthermore, as a consequence of our analysis, we deduce the asymptotic behavior of generic solutions of Painlev\'e-III, both D6 and D8 at z=0. We also deduce the large n behavior of the Umemura polynomials in a neighborhood of z=0.