V. P. Gurarii, D. W. H. Gillam
Published 2012-03-25Version 1
The Euler-Gauss linear transformation formula for the hypergeometric function was extended by Goursat for the case of logarithmic singularities. By replacing the perturbed Bessel differential equation by a monodromic functional equation, and studying this equation separately from the differential equation by an appropriate Laplace-Borel technique, we associate with the latter equation another monodromic relation in the dual complex plane. This enables us to prove a duality theorem and to extend Goursat's formula to much larger classes of functions.
A simple proof of a duality theorem with applications in viscoelasticity
Generalized wave polynomials and transmutations related to perturbed Bessel equations
A Neumann series of Bessel functions representation for solutions of perturbed Bessel equations
![QR code for arXiv:1203.5550 [math.CA]](http://oss.arxitics.com/images/favicon.svg)