Title of article
Remarks on a simple fractional-calculus approach to the solutions of the bessel differential equation of general order and some of its applications
Author/Authors
Pin-Yu Wang، نويسنده , , Shy-Der Lin، نويسنده , , H.M. Srivastava، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2006
Pages
10
From page
105
To page
114
Abstract
In a remarkably large number of recent works, one can find the emphasis upon (and demonstrations of) the usefulness of fractional calculus operators in the derivation of (explicit) particular solutions of significantly general families of linear ordinary and partial differential equations of the second and higher orders. The main object of the present paper is to continue our investigation of this simple fractional-calculus approach to the solutions of the classical Bessel differential equation of general order and to show how it would lead naturally to several interesting consequences which include (for example) an alternative derivation of the complete power-series solutions obtainable usually by the Frobenius method. The underlying analysis presented here is based chiefly upon some of the general theorems on (explicit) particular solutions of a certain family of linear ordinary fractional differintegral equations with polynomial coefficients.
Keywords
Differintegral equations , (ordinary and partial) Linear differential equations , Polynomial coefficients , Bessel functions , Hypergeometric representations , Integro-differential equations , Frobenius method , Trigonometric functions , Operators of fractional calculus , Bessel differential equation , Fuchsian (and non-Fuchsian) differential equations , Power-series solutions
Journal title
Computers and Mathematics with Applications
Serial Year
2006
Journal title
Computers and Mathematics with Applications
Record number
919732
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