BASIC HYPERGEOMETRIC FUNCTIONS and ORTHOGONAL LAURENT POLYNOMIALS
Data
2012-06-01
Autores
Costa, Marisa S. [UNESP]
Godoy, Eduardo
Lamblem, Regina L.
Sri Ranga, A. [UNESP]
Título da Revista
ISSN da Revista
Título de Volume
Editor
Amer Mathematical Soc
Resumo
A three-complex-parameter class of orthogonal Laurent polynomials on the unit circle associated with basic hypergeometric or q-hypergeometric functions is considered. To be precise, we consider the orthogonality properties of the sequence of polynomials {(2)Phi(1)(q(-n), q(b+1); q(-c+b-n); q,q(-c+d-1)z)}(n=0)(infinity), where 0 < q < 1 and the complex parameters b, c and d are such that b not equal -1, -2, ... , c - b + 1 not equal -1, -2, ... , Re(d) > 0 and Re(c - d + 2) > 0. Explicit expressions for the recurrence coefficients, moments, orthogonality and also asymptotic properties are given. By a special choice of the parameters, results regarding a class of Szego polynomials are also derived.
Descrição
Palavras-chave
Basic hypergeometric functions, Continued fractions, Orthogonal Laurent polynomials, Szegö polynomials
Como citar
Proceedings of The American Mathematical Society. Providence: Amer Mathematical Soc, v. 140, n. 6, p. 2075-2089, 2012.