References
- Yakubovich S. On the theory of orthogonal polynomials for the weight xνexp(−x−t/x). I. Integral Transforms Spec Funct. 2022. DOI:10.1080/10652469.2022.2035381
- Erdélyi A, Magnus W, Oberhettinger F, et al. Higher transcendental functions. Vols. I and II. New York: McGraw-Hill; 1953.
- Belmehdi S. On semi-classical linear functionals of class s = 1. Classification and integral representations. Indag Math (NS). 1992;3(3):253–275.
- Chen Y, Its A. Painlevé III and a singular linear statistics in Hermitian random matrix ensembles, I. J Approx Theory. 2010;162:270–297.
- Chen Y, Ismail MEH. Ladder operators and differential equations for orthogonal polynomials. J Phys A. 1997;30(22):7817–7829.
- Ismail MEH. Classical and quantum orthogonal polynomials in one variable. Cambridge: Cambridge University Press; 2005. (Encyclopedia of mathematics and its applications; vol. 98).
- Van Assche W. Orthogonal polynomials and Painlevé equations. Cambridge: Cambridge University Press; 2018. (Australian mathematical society lecture series; vol. 27).
- Yakubovich S, Luchko Yu.. The hypergeometric approach to integral transforms and convolutions. Dordrecht: Kluwer Academic Publishers; 1994. (Mathematics and applications; vol. 287).
- Prudnikov AP, Brychkov YuA, Marichev OI. Vol. I, Elementary functions. New York: Gordon and Breach; 1986; Vol. II, Special functions. New York: Gordon and Breach; 1986; Vol. III, More special functions. New York: Gordon and Breach; 1990.
- Brychkov YUA. Handbook of special functions: derivatives, integrals, series and other formulas. Boca Raton, FL: Chapman and Hall/CRC; 2008.