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Weak type commutator and Lipschitz estimates: resolution of the Nazarov-Peller conjecture
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Weak type commutator and Lipschitz estimates: resolution of the Nazarov-Peller conjecture
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Let $\mathcal{M}$ be a semi-finite von Neumann algebra and let $f: \mathbb{R} \rightarrow \mathbb{C}$ be a Lipschitz function. If $A,B\in\mathcal{M}$ are self-adjoint operators such that $[A,B]\in L_1(\mathcal{M}),$ then $$\|[f(A),B]\|_{1,\infty}\leq c_{abs}\|f'\|_{\infty}\|[A,B]\|_1,$$ where $c_{abs}$ is an absolute constant independent of $f$, $\mathcal{M}$ and $A,B$ and $\|\cdot\|_{1,\infty}$ denotes the weak $L_1$-norm. If $X,Y\in\mathcal{M}$ are self-adjoint operators such that $X-Y\in L_1(\mathcal{M}),$ then $$\|f(X)-f(Y)\|_{1,\infty}\leq c_{abs}\|f'\|_{\infty}\|X-Y\|_1.$$ This result resolves a conjecture raised by F. Nazarov and V. Peller implying a couple of existing results in perturbation theory.
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Cited by 1 Pith paper
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Algebraic Calder\'on-Zygmund theory
Develops an abstract Markov semigroup-based Calderón-Zygmund theory that constructs BMO spaces and endpoint inequalities for arbitrary von Neumann algebras and various classical settings.
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