A universal lower bound for the kernel estimate

Institute for Advanced Study ## 0. Introduction In this note we give an estimate from below for the fundamental solution of the heat equation on an open metric ball BR(x), of radius R, in a Riemannian manifold M". We assume that, for all r < R, B,(x) is compact. The estimate is in the form of a co

We study the connections between dynamical properties of Schro dinger operators H on separable Hilbert space H and the properties of corresponding spectral measures. Our main result establishes a relation for the moment of order p of the form H dt L , pÂd (T ). (1) Here L , pÂd (T ) is a function

We give some lower bounds on the separations sep,( A, B), sepl A, B), and sep,( A, B). The bounds h s ow that the separation of two matrices A and B is closely related to the separation between the spectral sets of A and B, the structure of the Jordan canonical forms of A and B, and the departures f