Orthonormal Polynomials on the Unit Circle and Spatially Discrete Painlev\'e II Equation
Abstract
We consider the polynomials φn(z)= n (zn+ bn-1 zn-1+ >...) orthonormal with respect to the weight (λ (z+ 1/z)) dz/2 π i z on the unit circle in the complex plane. The leading coefficient n is found to satisfy a difference-differential (spatially discrete) equation which is further proved to approach a third order differential equation by double scaling. The third order differential equation is equivalent to the Painlev\'e II equation. The leading coefficient and second leading coefficient of φn(z) can be expressed asymptotically in terms of the Painlev\'e II function.
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