Product Manifolds with Improved Spectral Cluster and Weyl Remainder Estimates
Abstract
We show that if Y is a compact Riemannian manifold with improved Lq eigenfunction estimates then, at least for large enough exponents, one always obtains improved Lq bounds on the product manifold X× Y if X is another compact manifold. Similarly, improved Weyl remainder term bounds on the spectral counting function of Y lead to corresponding improvements on X× Y. The latter results partly generalize recent ones of Iosevich and Wyman [14] involving products of spheres. Also, if Y is a product of five or more spheres, we are able to obtain optimal Lq(Y) and Lq(X× Y) eigenfunction and spectral cluster estimates for large q, which partly addresses a conjecture from [14] and is related to (and is partly based on) classical bounds for the number of integer lattice point on λ · Sn-1 for n5.
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