A Spectral Study of the Second-Order Exceptional X1-Jacobi Differential Expression and a Related Non-classical Jacobi Differential Expression

Abstract

The exceptional X1-Jacobi differential expression is a second-order ordinary differential expression with rational coefficients; it was discovered by G\'omez-Ullate, Kamran and Milson in 2009. In their work, they showed that there is a sequence of polynomial eigenfunctions \P n(α,β)\n=1∞ called the exceptional X1-Jacobi polynomials. There is no exceptional X1-Jacobi polynomial of degree zero. These polynomials form a complete orthogonal set in the weighted Hilbert space L2((-1,1);wα,β), where wα,β is a positive rational weight function related to the classical Jacobi weight. Among other conditions placed on the parameters α and β, it is required that α,β>0. In this paper, we develop the spectral theory of this expression in L2((-1,1);wα,β). We also consider the spectral analysis of the `extreme' non-exceptional case, namely when α=0. In this case, the polynomial solutions are the non-classical Jacobi polynomials \ Pn(-2,β)\ n=2∞. We study the corresponding Jacobi differential expression in several Hilbert spaces, including their natural L2 setting and a certain Sobolev space S where the full sequence \ Pn(-2,β)\ n=0∞ is studied and a careful spectral analysis of the Jacobi expression is carried out.