Differential operator for discrete Gegenbauer--Sobolev orthogonal polynomials: eigenvalues and asymptotics

Abstract

We consider the following discrete Sobolev inner product involving the Gegenbauer weight (f,g)S:=∫-11f(x)g(x)(1-x2)αdx+M[f(j)(-1)g(j)(-1)+f(j)(1)g(j)(1)], where α>-1, j∈ N \0\, and M>0. Let \Qn(α,M,j)\n≥0 be the sequence of orthogonal polynomials with respect to the above inner product. These polynomials are eigenfunctions of a differential operator T. We establish the asymptotic behavior of the corresponding eigenvalues. Furthermore, we calculate the exact value r0 = n→ ∞ (x∈ [-1,1] |Qn(α,M,j)(x)|) λn, where \Qn(α,M,j)\n≥0 are the sequence of orthonormal polynomials with respect to this Sobolev inner product. This value r0 is related to the convergence of a series in a left--definite space. Finally, we study the Mehler--Heine type asymptotics for \Qn(α,M,j)\n≥0.