Solutions, Spectrum, and Dynamica for Schr\"odinger Operators on Infinite Domains

Abstract

Let H be a Schr\"odinger operator defined on an unbounded domain D in Rd with Dirichlet boundary conditions (D may equal Rd in particular). Let u(x,E) be a solution of the Schr\"odinger equation (H-E)u(x,E)=0, and let BR denote a ball of radius R centered at zero. We show relations between the rate of growth of the L2 norm \|u(x,E)\|L2(BR D) of such solutions as R goes to infinity, and continuity properties of spectral measures of the operator H. These results naturally lead to new criteria for identification of various spectral properties. We also prove new fundamental relations berween the rate of growth of L2 norms of generalized eigenfunctions, dimensional properties of the spectral measures, and dynamical properties of the corresponding quantum systems. We apply these results to study transport properties of some particular Schr\"odinger operators.

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