Sharp estimates for singular values of Hankel operators

Abstract

We consider compact Hankel operators realized in 2( Z+) as infinite matrices with matrix elements h(j+k). Roughly speaking, we show that, for all α>0, the singular values sn of satisfy the bound sn= O(n-α) as n ∞ provided h(j)= O(j-1( j)-α) as j ∞. These estimates on sn are sharp in the power scale of α. Similar results are obtained for Hankel operators realized in L2( R+) as integral operators with kernels h(t+s). In this case the estimates of singular values of are determined by the behavior of h(t) as t 0 and as t∞.