Eigenvalue decay of operators on harmonic function spaces

Oscar F. Bandtlow; Cho-Ho Chu

arXiv:0903.0865·math.FA·February 26, 2014

Eigenvalue decay of operators on harmonic function spaces

Oscar F. Bandtlow, Cho-Ho Chu

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Abstract

Let $Ω$ be an open set in $R^{d}$ $(d > 1)$ and $h (Ω)$ the Fr\'echet space of harmonic functions on $Ω$ . Given a bounded linear operator $L : h (Ω) \to h (Ω)$ , we show that its eigenvalues $λ_{n}$ , arranged in decreasing order and counting multiplicities, satisfy $∣ λ_{n} ∣ \leq K exp (- c n^{1/ (d - 1)})$ , where $K$ and $c$ are two explicitly computable positive constants.

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