Perturbation of Burkholder's martingale transform and Monge--Amp\`ere equation

Abstract

Let \dk\k ≥ 0 be a complex martingale difference in Lp[0,1], where 1<p<∞, and \k\k ≥ 0 a sequence in \ 1\. We obtain the following generalization of Burkholder's famous result. If τ ∈ [- 12, 12] and n ∈ + then |Σk=0n(\c k τ) dk|Lp([0,1], 2) ≤ ((p*-1)2 + τ2) 12|Σk=0ndk|Lp([0,1], ), where ((p*-1)2 + τ2) 12 is sharp and p*-1 = \p-1, 1p-1\. For 2≤ p<∞ the result is also true with sharp constant for τ ∈ .