Nobutaka Nakazono, “Hypergeometric Solutions of the <nobr>$A_4^{(1)}$</nobr>-Surface <nobr>$q$</nobr>-Painlevé IV Equation”, SIGMA, 2014, Volume 10,090, 23 pp.

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Hypergeometric Solutions of the $A_4^{(1)}$-Surface $q$-Painlevé IV Equation

Nobutaka Nakazono

School of Mathematics and Statistics, The University of Sydney, New South Wales 2006, Australia

Abstract: We consider a $q$-Painlevé IV equation which is the $A_4^{(1)}$-surface type in the Sakai's classification. We find three distinct types of classical solutions with determinantal structures whose elements are basic hypergeometric functions. Two of them are expressed by ${}_2\varphi_1$ basic hypergeometric series and the other is given by ${}_2\psi_2$ bilateral basic hypergeometric series.

Keywords: $q$-Painlevé equation; basic hypergeometric function; affine Weyl group; $\tau$-function; projective reduction; orthogonal polynomial.

MSC: 33D05; 33D15; 33D45; 33E17; 39A13

Received: June 6, 2013; in final form August 14, 2014; Published online August 22, 2014

Language: English

DOI: 10.3842/SIGMA.2014.090