Asymptotic spectral properties of the Hilbert L-matrix

Abstract

We study asymptotic spectral properties of the generalized Hilbert L-matrix \[ Ln()=(1(i,j)+)i,j=0n-1, \] for large order n. First, for general ≠0,-1,-2,…, we deduce the asymptotic distribution of eigenvalues of Ln() outside the origin. Second, for >0, asymptotic formulas for small eigenvalues of Ln() are derived. Third, in the classical case =1, we also prove asymptotic formulas for large eigenvalues of Ln Ln(1). I particular, we obtain an asymptotic expansion of \|Ln\| improving Wilf's formula for the best constant in truncated Hardy's inequality.