Michael J. Schlosser, “Macdonald Polynomials and Multivariable Basic Hypergeometric Series”, SIGMA, 2007, Volume 3,056, 30 pp.

This article is cited in 4 papers

Macdonald Polynomials and Multivariable Basic Hypergeometric Series

Michael J. Schlosser

Fakultät für Mathematik, Universität Wien, Nordbergstraße 15, A-1090 Vienna, Austria

Abstract: We study Macdonald polynomials from a basic hypergeometric series point of view. In particular, we show that the Pieri formula for Macdonald polynomials and its recently discovered inverse, a recursion formula for Macdonald polynomials, both represent multivariable extensions of the terminating very-well-poised ${}_6\phi_5$ summation formula. We derive several new related identities including multivariate extensions of Jackson's very-well-poised ${}_8\phi_7$ summation. Motivated by our basic hypergeometric analysis, we propose an extension of Macdonald polynomials to Macdonald symmetric functions indexed by partitions with complex parts. These appear to possess nice properties.

Keywords: Macdonald polynomials; Pieri formula; recursion formula; matrix inversion; basic hypergeometric series; ${}_6\phi_5$ summation; Jackson’s ${}_8\phi_7$ summation; $A_{n-1}$ series.

MSC: 33D52; 15A09; 33D67

Received: November 21, 2006; Published online March 30, 2007

Language: English

DOI: 10.3842/SIGMA.2007.056