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Large-degree asymptotics of rational Painleve-II functions. I

Rational solutions of the inhomogeneous Painleve-II equation and of a related coupled Painleve-II system have recently arisen in studies of fluid vortices and of the sine-Gordon equation. For the sine-Gordon application in particular it is of interest to understand the large-degree asymptotic behavior of the rational Painleve-II functions. We explicitly compute the leading-order large-degree asymptotics of these two families of rational functions valid in the whole complex plane with the exception of a neighborhood of a certain piecewise-smooth closed curve. We obtain rigorous error bounds by using the Deift-Zhou nonlinear steepest-descent method for Riemann-Hilbert problems.

preprint2013arXivOpen access
Robert J. BuckinghamPeter D. Miller
math-phmath.MPmath.CAnlin.SI
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Robert J. BuckinghamPeter D. Miller

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