Asymptotic greediness of the Haar system in the spaces Lp[0,1], 1<p<∞

Abstract

Our aim in this paper is to attain a sharp asymptotic estimate for the greedy constant Cg[H(p),Lp] of the (normalized) Haar system H(p) in Lp[0,1] for 1<p<∞. We will show that the superdemocracy constant of H(p) in Lp[0,1] grows as p=\p,p/(p-1)\ as p* goes to ∞. Thus, since the unconditionality constant of H(p) in Lp[0,1] is p*-1, the well-known general estimates for the greedy constant of a greedy basis obtained from the intrinsic features of greediness (namely, democracy and unconditionality) yield that p Cg[H(p),Lp] (p)2. Going further, we develop techniques that allow us to close the gap between those two bounds, establishing that, in fact, Cg[H(p),Lp]≈ p.