相对论-几何纠缠:纠缠粒子系统的对称群

A. Ungar
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引用次数: 0

摘要

已知纠缠粒子涉及洛伦兹对称破坏。因此,我们关注了所有正整数$m$和$n$的签名$(m,n)$的洛伦兹变换。我们证明了这些形成了对称群,通过这些对称群可以理解$m$纠缠$n$维粒子的系统,就像签名$(1,3)$的常见洛伦兹群形成了对称群,通过这些对称群可以理解爱因斯坦的狭义相对论。一个新的,统一的参数实现的洛伦兹变换的任何签名$(m,n)$将底层的矩阵代数变成优雅和透明的结果。
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Relativistic-Geometric Entanglement: Symmetry Groups of Systems of Entangled Particles
It is known that entangled particles involve Lorentz symmetry violation. Hence, we pay attention to Lorentz transformations of signature $(m,n)$ for all positive integers $m$ and $n$. We show that these form the symmetry groups by which systems of $m$ entangled $n$-dimensional particles can be understood, just as the common Lorentz group of signature $(1,3)$ forms the symmetry group by which Einstein's special theory of relativity is understood. A novel, unified parametric realization of the Lorentz transformations of any signature $(m,n)$ shakes down the underlying matrix algebra into elegant and transparent results.
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来源期刊
Geometry, Integrability and Quantization
Geometry, Integrability and Quantization Mathematics-Mathematical Physics
CiteScore
0.70
自引率
0.00%
发文量
4
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