Lebesgue bounds for multilinear spherical and lacunary maximal averages
Abstract
We establish Lp1( Rd) × ·s × Lpn( Rd) → Lr( Rd) bounds for spherical averaging operators An in dimensions d ≥ 2 for indices 1 p1,… , pn ∞ and 1p1+·s +1pn=1r. We obtain this result by first showing that An maps L1 × ·s × L1 → L1. We also obtain similar estimates for lacunary maximal spherical averages in the largest possible open region of indices.
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