Multipliers for spherical harmonic expansions

Abstract

For any bounded, regulated function m: [0,∞) C, consider the family of operators \ TR \ on the sphere Sd such that TR f = m(k/R) f for any spherical harmonic f of degree k. We completely characterize the compactly supported functions m for which the operators \ TR \ are uniformly bounded on Lp(Sd), in the range 1/(d-1) < |1/p - 1/2| < 1/2. We obtain analogous results in the more general setting of multiplier operators for eigenfunction expansions of an elliptic pseudodifferential operator P on a compact manifold M, under curvature assumptions on the principal symbol of P, and assuming the eigenvalues of P are contained in an arithmetic progression. One consequence of our result are new transference principles controlling the Lp boundedness of the multiplier operators associated with a function m, in terms of the Lp operator norm of the radial Fourier multiplier operator with symbol m(|·|): Rd C. In order to prove these results, we obtain new quasi-orthogonality estimates for averages of solutions to the half-wave equation ∂t - i P = 0, via a connection between pseudodifferential operators satisfying an appropriate curvature condition and Finsler geometry.

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