Fourier inversion theorems for integral transforms involving Bessel functions

TL;DR

This paper explores the derivation and properties of generalized Weber-Orr integral transforms using partial differential equations, including their invertibility, spectral decomposition, and inversion formulas.

Contribution

It introduces a new approach to studying Weber-Orr transforms, deriving inversion formulas and analyzing spectral properties involving zero eigenvalues.

Findings

Established invertibility theorems for generalized Weber-Orr transforms.

Derived spectral decomposition including zero eigenvalue functions.

Provided a complete derivation of inversion formulas for these transforms.

Abstract

Usually such area of mathematics as differential equations acts as a consumer of results given by functional analysis. This article will give an example of the reverse interaction of these two fields of knowledge. Namely, the derivation and study of integral transforms will be carried out using partial differential equations. We will study generalised Weber-Orr transforms - its invertibility theorems in $f\in L_1\cap L_2$, spectral decomposition, Plancherel-Parseval identity. These transforms possess nontrivial kernel, so spectral decomposition must involve not only continuous spectrum, but also eigen functions which correspond to zero eigen value. We give a new approach to the study of classical and generalized Weber-Orr transforms with a complete derivation of the inversion formulas.