Weighted spectral cluster bounds and a sharp multiplier theorem for ultraspherical Grushin operators
Abstract
We study degenerate elliptic operators of Grushin type on the d-dimensional sphere, which are singular on a k-dimensional sphere for some k < d. For these operators we prove a spectral multiplier theorem of Mihlin-H\"ormander type, which is optimal whenever 2k ≤ d, and a corresponding Bochner-Riesz summability result. The proof hinges on suitable weighted spectral cluster bounds, which in turn depend on precise estimates for ultraspherical polynomials.
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