On the Lp-theory of vector-valued elliptic operators

Abstract

In this paper, we study vector--valued elliptic operators of the form Lf:=div(Q∇ f)-F·∇ f+div(Cf)-Vf acting on vector-valued functions f:Rdm and involving coupling at zero and first order terms. We prove that L admits realizations in Lp(Rd,Rm), for 1<p<∞, that generate analytic strongly continuous semigroups provided that V=(vij)1 i,j m is a matrix potential with locally integrable entries satisfying a sectoriality condition, the diffusion matrix Q is symmetric and uniformly elliptic and the drift coefficients F=(Fij)1 i,j m and C=(Cij)1 i,j m are such that Fij,Cij:Rdd are bounded. We also establish a result of local elliptic regularity for the operator L, we investigate on the Lp-maximal domain of L and we characterize the positivity of the associated semigroup.