Quantum particle localization observables on Cauchy surfaces of Minkowski spacetime and their causal properties

IF 1.3 3区 物理与天体物理 Q3 PHYSICS, MATHEMATICAL
Carmine De Rosa, Valter Moretti
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引用次数: 0

Abstract

We introduce and study a general notion of spatial localization on spacelike smooth Cauchy surfaces of quantum systems in Minkowski spacetime. The notion is constructed in terms of a coherent family of normalized POVMs, one for each said Cauchy surface. We prove that a family of POVMs of this type automatically satisfies a causality condition which generalizes Castrigiano’s one and implies it when restricting to flat spacelike Cauchy surfaces. As a consequence, no conflict with Hegerfeldt’s theorem arises. We furthermore prove that such families of POVMs do exist for massive Klein–Gordon particles, since some of them are extensions of already known spatial localization observables. These are constructed out of positive definite kernels or are defined in terms of the stress–energy tensor operator. Some further features of these structures are investigated, in particular the relation with the triple of Newton–Wigner selfadjoint operators and a modified form of Heisenberg inequality in the rest 3-spaces of Minkowski reference frames.

闵科夫斯基时空考奇面上的量子粒子局域化观测值及其因果特性
我们引入并研究了闵科夫斯基时空中量子系统的空间相似光滑考奇曲面上的空间定位的一般概念。这个概念是通过归一化 POVM 的相干族构建的,每一个所述考奇曲面都有一个归一化 POVM。我们证明,这种类型的 POVMs 族自动满足因果关系条件,该条件概括了卡斯特里奇亚诺的因果关系条件,并在局限于平坦的类空间考奇曲面时隐含了该条件。因此,这与赫格菲尔特定理并不冲突。我们还进一步证明,对于大质量克莱因-戈登粒子,确实存在这样的 POVMs 系列,因为其中一些是对已知空间定位观测值的扩展。它们由正定核构造而成,或根据应力-能量张量算子定义。我们还研究了这些结构的一些进一步特征,特别是与牛顿-维格纳自联合算子三重的关系,以及闵科夫斯基参照系静止 3 空间中海森堡不等式的修正形式。
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来源期刊
Letters in Mathematical Physics
Letters in Mathematical Physics 物理-物理:数学物理
CiteScore
2.40
自引率
8.30%
发文量
111
审稿时长
3 months
期刊介绍: The aim of Letters in Mathematical Physics is to attract the community''s attention on important and original developments in the area of mathematical physics and contemporary theoretical physics. The journal publishes letters and longer research articles, occasionally also articles containing topical reviews. We are committed to both fast publication and careful refereeing. In addition, the journal offers important contributions to modern mathematics in fields which have a potential physical application, and important developments in theoretical physics which have potential mathematical impact.
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