Weyl formula for the negative dissipative eigenvalues of Maxwell's equations
Abstract
Let V(t) = etGb,\: t ≥ 0, be the semigroup generated by Maxwell's equations in an exterior domain ⊂ R3 with dissipative boundary condition Etan- γ(x) ( Btan) = 0, γ(x) > 0, ∀ x ∈ = ∂ . We study the case when = \x ∈ R3:\: |x| > 1\ and γ ≠ 1 is a constant. We establish a Weyl formula for the counting function of the negative real eigenvalues of Gb.
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