Maximal inequalities for derivatives of spherical means
Abstract
We give an alternative formulation of Stein's maximal inequality for generalised spherical averages in terms of derivatives of standard spherical means: if \[ k 0, d 2 k + 3 , dd - k - 1 < p < d - 1k , \] and σ is the normalised surface measure on the unit sphere S, then the maximal operator \[f r > 0 \, rk (ddr)k ∫ S f(· + r y) σ(dy) \] is bounded on Lp, with a constant that is independent of the dimension d.
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