Sharp Lp estimates of powers of the complex Riesz transform

Abstract

Let R1,2 be scalar Riesz transforms on R2. We prove that the Lp norms of k-th powers of the operator R2+iR1 behave exactly as |k|1-2/pp, uniformly in k∈Z\0\, p≥2. This gives a complete asymptotic answer to a question suggested by Iwaniec and Martin in 1996. The main novelty are the lower estimates, of which we give three different proofs. We also conjecture the exact value of \|(R2+iR1)k\|p. Furthermore, we establish the sharp behaviour of weak (1,1) constants of (R2+iR1)k and an L∞ to BMO estimate that is sharp up to a logarithmic factor.