A simple proof that the Riesz projection is bounded on Lp(T) for 1<p<∞
Abstract
Let P denote the Riesz projection on the unit circle T and suppose that 1<p<∞. We present a simple proof of the bound \|Pf\|p ≤ (p,q) \|f\|p, where f is in Lp(T) and p-1+q-1=1. Our proof is a variation of a classical argument due to M. Riesz demonstrating that the Hilbert transform is bounded on Lp(T).
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