Green functions of Fractional Partial Differential Equation With a Modified Elliptic Potential By a Weighted Bessel Function

U.S.  Idiong

Green functions of Fractional Partial Differential Equation With a Modified Elliptic Potential By a Weighted Bessel Function

U.S. Idiong Department of Mathematics, Adeyemi Federal University of Education, Ondo City, Nigeria.

Keywords: Elliptic functions, Hankel transform, Reisz derivative, weighted Fourier transform.

Abstract

In this paper, the Green function of a fractional partial differential equation [(−Δ)1+α + V (x)]Ψ = δ(x − a), α ∈ (0, 1) is obtained where the Laplacian Δ, the potential V (x) and the Dirac delta function δ(x) are defined over a closed ball B(0, r) of radius r > 0 in an Euclidean space Rn and V (x) is a modified vector-valued Weierstrass sigma elliptic potential weighted by a Bessel function. A combination of Fourier and Hankel transform techniques are employed in obtaining the main result.

Published

2024-07-30

How to Cite

Idiong, U. (2024). Green functions of Fractional Partial Differential Equation With a Modified Elliptic Potential By a Weighted Bessel Function. International Journal of Mathematical Sciences and Optimization: Theory and Applications, 10(3), 133 - 139. Retrieved from http://ijmso.unilag.edu.ng/article/view/2202

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Issue

Vol 10 No 3 (2024)

Section

Articles

This is an Open Access article distributed under the terms of the Creative Commons Attribution 4.0 International License, which permits unrestricted use, distribution, adaptation, and reproduction in any medium, provided that the original work is properly cited.