DIFFERENTIAL EQUATION WITH POCHHAMMER POLYNOMIALS (x)n SOLUTIONS (x)1 TO (x)4
Abstract
In this paper we present a third order differential equation that has the Pochhammer polynomials from orders one through four as solutions. Obtaining this equation is useful to characterize the Pochhammer polynomials in a similar way to other families of special polynomials. We believe that an equation for higher orders is possible following the same methodology.
Downloads
References
K. Oldham, J. Myland, J. Spanier, An Atlas of Functions, Second Edition, Springer, (2018).
G. B. Arfken, H. J. Weber, Mathematical Methods for Physicists, Elsevier, (2005).
V. Aboites, M. Ramírez, Simple approach to special polynomials: Laguerre, Hermite, Legendre, Tchebycheff, and Gegenbauer, In Applied Mathematics, IntechOpen, (2019).
Copyright (c) 2020 IJRDO - Journal of Mathematics (ISSN: 2455-9210)
This work is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.
Author(s) and co-author(s) jointly and severally represent and warrant that the Article is original with the author(s) and does not infringe any copyright or violate any other right of any third parties, and that the Article has not been published elsewhere. Author(s) agree to the terms that the IJRDO Journal will have the full right to remove the published article on any misconduct found in the published article.
