The Hilbert L-matrix

Abstract

We analyze spectral properties of the Hilbert L-matrix (1(m,n)+)m,n=0∞ regarded as an operator L acting on 2(N0), for ∈R, ≠0,-1,-2,…. The approach is based on a spectral analysis of the inverse of L, which is an unbounded Jacobi operator whose spectral properties are deducible in terms of the unit argument 3F2-hypergeometric functions. In particular, we give answers to two open problems concerning the operator norm of L published by L. Bouthat and J. Mashreghi in [Oper. Matrices 15, No. 1 (2021), 47--58]. In addition, several general aspects concerning the definition of an L-operator, its positivity, and Fredholm determinants are also discussed.