Asymptotic behaviours of q-orthogonal polynomials from a q-Riemann Hilbert Problem
Abstract
We describe a Riemann-Hilbert problem for a family of q-orthogonal polynomials, \ Pn(x) \n=0∞, and use it to deduce their asymptotic behaviours in the limit as the degree, n, approaches infinity. We find that the q-orthogonal polynomials studied in this paper share certain universal behaviours in the limit n∞. In particular, we observe that the asymptotic behaviour near the location of their smallest zeros, x qn/2, and norm, \|Pn\|2, are independent of the weight function as n∞.
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