Trace formulas for a class of Toeplitz-like operators II

In this paper we derive second-order asymptotic results for matrices Matrices of the above form can be thought of as variable-coefficient Toeplitz matrices, or a discrete analogue of a pseudodifferential operator. Ideas from pseudodifferential operator theory are used in the proof.

Let \(p\) be the principal symbol of a hyperbolic (pseudo) differential operator of order \(m\) admitting at most double characteristic roots. Suppose that at each point \(\rho\) of the double characteristic manifold \(\Sigma\) of \(p\) the Hamiltonian matrix of \(p, F_{p}\), has a Jordan block of d

Let H =&( 2 Â2) 2+V(x) be a Schro dinger operator on R n , with smooth potential V(x) Ä + as |x| Ä + . The spectrum of H is discrete, and one can study the asymptotic of the smoothed spectral density We shall investigate the case where E is a critical value of the symbol H of H and, extending the w