Singular value asymptotics on compact smooth Riemaniann manifolds
Abstract
Let (X,G) be a d-dimensional compact smooth Riemannian manifold equipped with Laplace-Beltrami operator G, and let X be the C-algebra obtained by locally transferring the C-algebra generated by multiplication operators and Riesz transforms on Rd. Denote symX the principal symbol mapping of X. For any S∈X, we prove that, in the framework of C-algebra, align* t→∞t1pμ(t,S(1+G)-d2p) =(2π[d]d)-1p\| symX(S)\|Lp(TX,e-qGdλ), align* where 0<p<∞, e-qG is the canonical weight on X, and dλ is the Liouville measure on the cotangent bundle TX.
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