Quasi-diagonalization of Hankel operators

Abstract

We show that all Hankel operators H realized as integral operators with kernels h(t+s) in L2 ( R+) can be quasi-diagonalized as H= L* L . Here L is the Laplace transform, is the operator of multiplication by a function (distribution) σ(λ), λ∈ R. We find a scale of spaces of test functions where L acts as an isomorphism. Then L* is an isomorphism of the corresponding spaces of distributions. We show that h= L* σ which yields a one-to-one correspondence between kernels h(t) and sigma-functions σ(λ) of Hankel operators. The sigma-function of a self-adjoint Hankel operator H contains substantial information about its spectral properties. Thus we show that the operators H and have the same numbers of positive and negatives eigenvalues. In particular, we find necessary and sufficient conditions for sign-definiteness of Hankel operators. These results are illustrated at examples of quasi-Carleman operators generalizing the classical Carleman operator with kernel h(t)=t-1 in various directions. The concept of the sigma-function directly leads to a criterion (equivalent of course to the classical Nehari theorem) for boundedness of Hankel operators. Our construction also shows that every Hankel operator is unitarily equivalent by the Mellin transform to a pseudo-differential operator with amplitude which is a product of functions of one variable only (of x∈ R and of its dual variable).