Abstract
In recent years, several workers demonstrated the usefulness of fractional calculus in the derivation of particular solutions of a number of familiar second-order differential equations associated (for example) with Gauss, Legendre, Jacobi, Chebyshev, Coulomb, Whittaker, Euler, Hermite, and Weber equations. The main object of this paper is to show how some of the most recent contributions on this subject, involving the Weber equations and their various generalized forms, can be obtained by suitably applying a general theorem on particular solutions of a certain family of fractional differintegral equations.
Citation
Shih-Tong Tu. Yu-Tan Huang. I-Chun Chen. H. M. Srivastava. "A CERTAIN FAMILY OF FRACTIONAL\\ DIFFERINTEGRAL EQUATIONS." Taiwanese J. Math. 4 (3) 417 - 426, 2000. https://doi.org/10.11650/twjm/1500407258
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