Optimal dimension-dependent p and 1,∞ estimates of the discrete Riesz Transforms

Abstract

In this paper, we are concerned with the optimal dimension-dependent p norm of the discrete Riesz Transforms Rdis(k) on Zd given by the singular convolution kernel Kk(m)=cd mk/|m|d+1, where cd=Γ(d+12)/π(d+1)/2 . We show that for fixed 1<p<∞, when d ∞ \|Rdis( k )\| p( Zd ) → p( Zd )=2cd( 1+( 2+o( 1 ) ) d2d2 ) . The operator norm of Rdis(k) grows super-exponentially as d∞ since cd(d-12eπ)d-12d-1π by Stirling's formula, which gives a negative answer to the conjecture proposed by Bañuelos, Kim and Kwaśnicki in BKK. The optimal dimension-dependent 1,∞ estimate of Rdis(k) is also established.