Kuznecov formulae for fractal measures
Abstract
Let (M,g) be a compact, connected Riemannian manifold of dimension n 2, and let \ej\j=0∞ be an orthonormal basis of Laplace eigenfunctions -g ej=λj2 ej. Given a finite Borel measure μ on M, consider the Kuznecov sum \[ Nμ(λ):=Σλj λ|∫M ej\,dμ|2. \] Assume that μ admits an averaged s-density constant Aμ with correlation dimension s∈(0,n). We prove that \[Nμ(λ)= (2π)-(n-s)\, vol(B\,n-s)\,Aμ\,λn-s+ o(λn-s) (λ∞). \] The averaged s-density condition is necessary for such a one-term asymptotic, and in general, the remainder o(λn-s) is sharp in the sense that it cannot be improved uniformly to a power-saving error term. This extends the classical Kuznecov formula of Zelditch for smooth submanifold measures to a broad class of singular and fractal measures.
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