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28 March 2024
 
  » arxiv » nlin.SI/0208002

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Differential systems for biorthogonal polynomials appearing in 2-matrix models and the associated Riemann-Hilbert problem
M. Bertola ; B. Eynard ; J. Harnad ;
Date 1 Aug 2002
Journal Comm. Math. Phys. 243 no.2 (2003) 193-240
Subject Exactly Solvable and Integrable Systems; Classical Analysis and ODEs; Mathematical Physics | nlin.SI math-ph math.CA math.MP
AbstractWe consider biorthogonal polynomials that arise in the study of a generalization of two--matrix Hermitian models with two polynomial potentials V_1(x), V_2(y) of any degree, with arbitrary complex coefficients. Finite consecutive subsequences of biorthogonal polynomials (`windows’), of lengths equal to the degrees of the potentials, satisfy systems of ODE’s with polynomial coefficients as well as PDE’s (deformation equations) with respect to the coefficients of the potentials and recursion relations connecting consecutive windows. A compatible sequence of fundamental systems of solutions is constructed for these equations. The (Stokes) sectorial asymptotics of these fundamental systems are derived through saddle-point integration and the Riemann-Hilbert problem characterizing the differential equations is deduced.
Source arXiv, nlin.SI/0208002
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