Criteria for the Lp-dissipativity of systems of second order differential equations

Abstract

We give complete algebraic characterizations of the Lp-dissipativity of the Dirichlet problem for some systems of partial differential operators of the form ∂h( Ahk(x)∂k), were Ahk(x) are m× m matrices. First, we determine the sharp angle of dissipativity for a general scalar operator with complex coefficients. Next we prove that the two-dimensional elasticity operator is Lp-dissipative if and only if (1 2-1 p)2 ≤ 2(-1)(2-1) (3-4)2, being the Poisson ratio. Finally we find a necessary and sufficient algebraic condition for the Lp-dissipativity of the operator ∂h ( Ah(x)∂h), where Ah(x) are m× m matrices with complex L1 loc entries, and we describe the maximum angle of Lp-dissipativity for this operator.

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