Interpolating Between Rényi Entanglement Entropies for Arbitrary Bipartitions via Operator Geometric Means

IF 1.4 3区 物理与天体物理 Q2 PHYSICS, MATHEMATICAL
Dávid Bugár, Péter Vrana
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引用次数: 0

Abstract

The asymptotic restriction problem for tensors can be reduced to finding all parameters that are normalized, monotone under restrictions, additive under direct sums and multiplicative under tensor products, the simplest of which are the flattening ranks. Over the complex numbers, a refinement of this problem, originating in the theory of quantum entanglement, is to find the optimal rate of entanglement transformations as a function of the error exponent. This trade-off can also be characterized in terms of the set of normalized, additive, multiplicative functionals that are monotone in a suitable sense, which includes the restriction-monotones as well. For example, the flattening ranks generalize to the (exponentiated) Rényi entanglement entropies of order \(\alpha \in [0,1]\). More complicated parameters of this type are known, which interpolate between the flattening ranks or Rényi entropies for special bipartitions, with one of the parts being a single tensor factor. We introduce a new construction of subadditive and submultiplicative monotones in terms of a regularized Rényi divergence between many copies of the pure state represented by the tensor and a suitable sequence of positive operators. We give explicit families of operators that correspond to the flattening-based functionals, and show that they can be combined in a nontrivial way using weighted operator geometric means. This leads to a new characterization of the previously known additive and multiplicative monotones, and gives new submultiplicative and subadditive monotones that interpolate between the Rényi entropies for all bipartitions. We show that for each such monotone there exist pointwise smaller multiplicative and additive ones as well. In addition, we find lower bounds on the new functionals that are superadditive and supermultiplicative.

通过算子几何手段插值任意双分区的雷尼纠缠熵
张量的渐近限制问题可简化为找到所有参数,这些参数是归一化的、在限制条件下单调的、在直接相加条件下可加的、在张量乘积条件下可乘的,其中最简单的是扁平化等级。在复数上,这一问题的细化源自量子纠缠理论,即找到纠缠变换的最佳速率作为误差指数的函数。这种权衡也可以用归一化、加法、乘法函数的集合来描述,这些函数在适当的意义上是单调的,其中也包括限制单调函数。例如,扁平化阶数可以概括为阶数为\(α \ in [0,1]\)的(指数化)雷尼纠缠熵。已知的这类参数更为复杂,它们在扁平化秩或特殊双分区的雷尼缠熵之间插值,其中一部分是单一张量因子。我们根据张量所代表的纯态的多个副本与合适的正算子序列之间的正则化雷尼发散,引入了一种新的亚加法和亚乘法单调构造。我们给出了与基于扁平化的函数相对应的明确的算子族,并证明它们可以用加权算子几何方法以一种非难的方式结合起来。这就为之前已知的加法单调和乘法单调提供了新的特征,并给出了新的亚乘法单调和亚加法单调,它们在所有双分区的雷尼熵之间进行插值。我们证明,对于每个这样的单调,也存在点上较小的乘法和加法单调。此外,我们还找到了新函数的超加法和超乘法下限。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Annales Henri Poincaré
Annales Henri Poincaré 物理-物理:粒子与场物理
CiteScore
3.00
自引率
6.70%
发文量
108
审稿时长
6-12 weeks
期刊介绍: The two journals Annales de l''Institut Henri Poincaré, physique théorique and Helvetica Physical Acta merged into a single new journal under the name Annales Henri Poincaré - A Journal of Theoretical and Mathematical Physics edited jointly by the Institut Henri Poincaré and by the Swiss Physical Society. The goal of the journal is to serve the international scientific community in theoretical and mathematical physics by collecting and publishing original research papers meeting the highest professional standards in the field. The emphasis will be on analytical theoretical and mathematical physics in a broad sense.
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