Tanfer Tanriverdi¹ and JohnBryce Mcleod²

Copyright © 2008 Tanfer Tanriverdi and JohnBryce Mcleod. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

For any n, the contour integral y=coshn+1x∮C(cosh(zs)/(sinhz-sinhx)n+1dz,s2=-λ, is associated with differential equation d2y(x)/dx2+(λ+n(n+1)/cosh2x)y(x)=0. Explicit solutions for n=1 are obtained. For n=1, eigenvalues, eigenfunctions, spectral function, and eigenfunction expansions are explored. This differential equation which does have solution in terms of the trigonometric functions does not seem to have been explored and it is also one of the purposes of this paper to put it on record.