Lp norm of truncated Riesz transform and an improved dimension-free Lp estimate for maximal Riesz transform

Abstract

In this paper, we prove that the Lp(Rd) norm of the maximal truncated Riesz transform in terms of the Lp(Rd) norm of Riesz transform is dimension-free for any 2≤ p<∞, using integration by parts formula for radial Fourier multipliers. Moreover, we show that \|Rj*f\|Lp≤ (2+12)2p\|Rjf\|Lp,\ \ for\ \ p≥2,\ \ d≥2. As by products of our calculations, we infer the Lp norm contractivity of the truncated Riesz transforms Rtj in terms of Rj, and their accurate Lp norms. More precisely, we prove: \|Rtjf\|Lp≤\|Rjf\|Lp and \|Rtj\|Lp=\|Rj\|Lp, for all 1<p<+∞, j∈ \1,…,d\ and t>0.