Concentration estimates for band-limited spherical harmonics expansions via the large sieve principle
Abstract
We study a concentration problem on the unit sphere S2 for band-limited spherical harmonics expansions using large sieve methods. We derive upper bounds for concentration in terms of the maximum Nyquist density. Our proof uses estimates of the spherical harmonics coefficients of certain zonal filters. We also demonstrate an analogue of the classical large sieve inequality for spherical harmonics expansions.
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