Accretivity and form boundedness of second order differential operators

Abstract

Let L be the general second order differential operator with complex-valued distributional coefficients A=(ajk)j, k=1n, b=(bj)j=1n, and c in an open set ⊂eq Rn (n 1), with principal part either in the divergence form, L u= div \, (A ∇ u) + b ·∇ u + c \, u, or non-divergence form, L u= Σj, \, k=1n \, ajk \, ∂j ∂k u + b ·∇ u + c \, u . We give a survey of the results by the authors which characterize the following two properties of L: (1) -L is accretive, i.e., Re \, - L u, \, u 0; (2) L is form bounded, i.e., L u, u C \, ∇ u L2()2, for all complex-valued u ∈ C∞0().