On a polynomial scalar perturbation of a Schr\"odinger system in Lp-spaces

Abstract

In the paper KLMR the Lp-realization Lp of the matrix Schr\"odinger operator Lu=div(Q∇ u)+Vu was studied. The generation of a semigroup in Lp(d,m) and characterization of the domain D(Lp) has been established. In this paper we perturb the operator Lp of by a scalar potential belonging to a class including all polynomials and show that still we have a strongly continuous semigroup on Lp(d,m) with domain embedded in W2,p(d,m). We also study the analyticity, compactness, positivity and ultracontractivity of the semigroup and prove Gaussian kernel estimates. Further kernel estimates and asymptotic behaviour of eigenvalues of the matrix Schr\"odinger operator are investigated.