Powers of Symmetric Differential Operators I

Abstract

Let L be a linear symmetric differential operators on L2( R) whose domain is the Schwartz test function space, S. For the majority of this paper, it is assumed that the coefficient of L are polynomial functions on R. We will give criteria on the polynomial coefficients of L which guarantees that L is essentially self-adjoint, L≥-CI for some C<∞, and that S is a core for ( L+C) r for all r≥0. Given another polynomial coefficient differential operator, L, we will further give criteria on the coefficients L and L which implies operator comparison inequalities of the form ( L+C) r≤ Cr( L+C) r for all 0≤ r<∞. The last inequality generalized to allow for an added parameter, >0, in the coefficients is used to provide a large class of operators satisfying the hypotheses in our another paper "On the classical limit of quantum mechanics" (will be submitted very soon) where a strong form of the classical limit of quantum mechanics is shown to hold.