Browse > Article
http://dx.doi.org/10.11568/kjm.2017.25.2.181

THE RECURRENCE COEFFICIENTS OF THE ORTHOGONAL POLYNOMIALS WITH THE WEIGHTS ωα(x) = xα exp(-x3 + tx) AND Wα(x) = |x|2α+1 exp(-x6 + tx2 )  

Joung, Haewon (Department of mathematics Inha University)
Publication Information
Korean Journal of Mathematics / v.25, no.2, 2017 , pp. 181-199 More about this Journal
Abstract
In this paper we consider the orthogonal polynomials with weights ${\omega}_{\alpha}(x)=x^{\alpha}{\exp}(-x^3+tx)$ and $W_{\alpha}(x)={\mid}x{\mid}^{2{\alpha}+1}{\exp}(-x^6+tx^2)$. Using the compatibility conditions for the ladder operators for these orthogonal polynomials, we derive several difference equations satisfied by the recurrence coefficients of these orthogonal polynomials. We also derive differential-difference equations and second order linear ordinary differential equations satisfied by these orthogonal polynomials.
Keywords
Orthogonal polynomials; Recurrence coefficients; Ladder operators;
Citations & Related Records
연도 인용수 순위
  • Reference
1 Boelen L, Filipuk G, and Van Assche W, Recurrence coefficients of generalized Meixner polynomials and Painleve equations, J. Phys. A: Math. Theor. 44 (2011) 035202.   DOI
2 Bonan S and Clark D S, Estimates of the orthogonal polynomials with weight exp($-x^m$), m an even positive integer, J. Approx. Theory 46 (1986), 408-410.   DOI
3 Chen Y and Ismail M, Jacobi polynomials from compatibility conditions, Proc. Am. Math. Soc. 133 (2005), 465-472.   DOI
4 Chihara T S, An introduction to orthogonal polynomials, Gordon and Breach, New york 1978.
5 Filipuk G, Van Assche W, and Zhang L, The recurrence coefficients of semi-classical Laguerre polynomials and the fourth Painleve equation, J. Phys. A: Math. Theor. 45 (2012) 205201.   DOI
6 Shohat J, A di erential equation for orthogonal polynomials, Duke Math. J. 5(1939), 401-417.   DOI