On m-order logarithmic Schrödinger operator

Abstract

In this paper we study the logarithm of order m of the Schrödinger operator LV in Rd, for certain nonnegative potentials V. First, the operator m LV, m∈ N, is defined by using the spectral measure associated with the self-adjoint operator LV on a suitable subspace of L2( Rd). Then, the semigroup of operators \TtV\t>0 generated by LV allows us to extend the definition of m LV to a wider class of Lipschitz functions. By using logarithmic operators m LV, m∈ N, we prove Taylor expansions for the fractional powers LVs and LV-s with respect to the order s∈ (0,1), where the convergence is understood in Lp( Rd), 1<p<∞.