Rational Solutions of the Painlev\'e-III Equation: Large Parameter Asymptotics

Abstract

The Painlev\'e-III equation with parameters 0=n+m and ∞=m-n+1 has a unique rational solution u(x)=un(x;m) with un(∞;m)=1 whenever n∈Z. Using a Riemann-Hilbert representation proposed in BothnerMS18, we study the asymptotic behavior of un(x;m) in the limit n+∞ with m∈C held fixed. We isolate an eye-shaped domain E in the y=n-1x plane that asymptotically confines the poles and zeros of un(x;m) for all values of the second parameter m. We then show that unless m is a half-integer, the interior of E is filled with a locally uniform lattice of poles and zeros, and the density of the poles and zeros is small near the boundary of E but blows up near the origin, which is the only fixed singularity of the Painlev\'e-III equation. In both the interior and exterior domains we provide accurate asymptotic formul\ for un(x;m) that we compare with un(x;m) itself for finite values of n to illustrate their accuracy. We also consider the exceptional cases where m is a half-integer, showing that the poles and zeros of un(x;m) now accumulate along only one or the other of two "eyebrows", i.e., exterior boundary arcs of E.