Noncommutative sharp dual Doob inequalities
Abstract
Let (xk)k=1n be positive elements in the noncommutative Lebesgue space Lp(M), and let (Ek)k=1n be a sequence of conditional expectations with respect to an increasing subalgebras (Mn)k≥1 of the finite von Neumann algebra M. We establish the following sharp noncommutative dual Doob inequalities: equation* \| Σk=1nxk\|Lp(M)≤ 1p \| Σk=1nEk(xk)\|Lp(M), 0<p≤ 1, equation* and equation* \| Σk=1nEk(xk)\|Lp(M)≤ p\| Σk=1nxk\|Lp(M), 1≤ p≤ 2. equation* As applications, we obtain several noncommutative martingale inequalities with better constants.
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