Criterion for the functional dissipativity of second order differential operators with complex coefficients

Abstract

In the present paper we consider the Dirichlet problem for the second order differential operator E=∇(A ∇),where A is a matrix with complex valued L∞ entries. We introduce the concept of dissipativity of E with respect to a given function :R+ R+. Under the assumption that the Im\, A is symmetric, we prove that the condition |s\, '(s)| \, | Im\, A (x)\, , |≤ 2\, (s)\, [s\, (s)]'\, Re\, A(x) \, , (for almost every x∈⊂ RN and for any s>0, ∈ RN) is necessary and sufficient for the functional dissipativity of E.