Generation of semigroup for symmetric matrix Schr\"odinger operators in Lp-spaces

Abstract

In this paper we establish generation of analytic strongly continuous semigroup in Lp--spaces for the symmetric matrix Schr\"odinger operator div(Q∇ u)-Vu, where, for every x∈Rd, V(x)=(vij(x)) is a semi-definite positive and symmetric matrix. The diffusion matrix Q(·) is supposed to be strongly elliptic and bounded and the potential V satisfies the weak condition vij∈ L1loc(Rd), for all i,j∈\1,…,m\. We also characterize positivity of the semigroup and we investigate on its compactness.