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