由Ricci曲率有界于II的完全对数Sobolev不等式

IF 0.5 3区 数学 Q3 MATHEMATICS
Michael Brannan, Li Gao, M. Junge
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引用次数: 14

摘要

我们研究了Junge, Li和LaRacuente之前引入的“几何Ricci曲率下界”,用于各种例子,包括群von Neumann代数,自由正交量子群[公式:见文],变形高斯代数和量子环面。特别地,我们证明了[公式:见文]上的拉普拉斯算子允许通过经典正交群上的拉普拉斯-贝尔特拉米算子进行因数分解,从而建立了这两个算子之间的第一个联系。基于非负曲率条件,我们得到了相应量子Markov半群的修正log-Sobolev不等式的完全有界形式。证明了“几何Ricci曲率下界”在张量积和混合自由积下是稳定的。作为一个应用,我们得到了自由群因子上的字长半群的一个尖锐的Ricci曲率下界。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Complete Logarithmic Sobolev inequality via Ricci curvature bounded below II
We study the “geometric Ricci curvature lower bound”, introduced previously by Junge, Li and LaRacuente, for a variety of examples including group von Neumann algebras, free orthogonal quantum groups [Formula: see text], [Formula: see text]-deformed Gaussian algebras and quantum tori. In particular, we show that Laplace operator on [Formula: see text] admits a factorization through the Laplace–Beltrami operator on the classical orthogonal group, which establishes the first connection between these two operators. Based on a non-negative curvature condition, we obtain the completely bounded version of the modified log-Sobolev inequalities for the corresponding quantum Markov semigroups on the examples mentioned above. We also prove that the “geometric Ricci curvature lower bound” is stable under tensor products and amalgamated free products. As an application, we obtain a sharp Ricci curvature lower bound for word-length semigroups on free group factors.
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来源期刊
CiteScore
1.50
自引率
0.00%
发文量
13
审稿时长
>12 weeks
期刊介绍: This journal is devoted to topology and analysis, broadly defined to include, for instance, differential geometry, geometric topology, geometric analysis, geometric group theory, index theory, noncommutative geometry, and aspects of probability on discrete structures, and geometry of Banach spaces. We welcome all excellent papers that have a geometric and/or analytic flavor that fosters the interactions between these fields. Papers published in this journal should break new ground or represent definitive progress on problems of current interest. On rare occasion, we will also accept survey papers.
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