Lian Wu scite author profile

Abstract. We provide generalizations of Burkholder's inequalities involving conditioned square functions of martingales to the general context of martingales in noncommutative symmetric spaces. More precisely, we prove that Burkholder's inequalities are valid for any martingale in noncommutative space constructed from a symmetric space defined on the interval (0, ∞) with Fatou property and whose Boyd indices are strictly between 1 and 2. This answers positively a question raised by Jiao and may be viewed as a conditioned version of similar inequalities for square functions of noncommutative martingales. Using duality, we also recover the previously known case where the Boyd indices are finite and are strictly larger than 2.

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Noncommutative Burkholder/Rosenthal inequalities associated with convex functions

Randrianantoanina¹,

Wu²

2017

Ann. Inst. H. Poincaré Probab. Statist.

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Abstract. We prove noncommutative martingale inequalities associated with convex functions. More precisely, we obtain Φ-moment analogues of the noncommutative Burkholder inequalities and the noncommutative Rosenthal inequalities for any convex Orlicz function Φ whose Matuzewska-Orlicz indices pΦ and qΦ are such that 1 < pΦ ≤ qΦ < 2 or 2 < pΦ ≤ qΦ < ∞. These results generalize the noncommutative Burkholder/Rosenthal inequalities due to Junge and Xu.

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Noncommutative Davis type decompositions and applications

Randrianantoanina

2018

J. London Math. Soc.

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Lian Wu

Variable martingale Hardy spaces and their applications in Fourier analysis

Martingale inequalities in noncommutative symmetric spaces

Noncommutative Burkholder/Rosenthal inequalities associated with convex functions

Noncommutative Davis type decompositions and applications

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