Can the radial number of vortex modes control the orbital angular momentum?

IF 16.4 1区化学 Q1 CHEMISTRY, MULTIDISCIPLINARY

Accounts of Chemical Research Pub Date : 2022-12-01 DOI:10.18287/2412-6179-co-1169

A. Volyar, E. Abramochkin, M. Bretsko, Y. Akimova, Y. Egorov

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引用次数: 4

Abstract

In general, a standard Laguerre–Gauss (LG) beam, whose state is given by two quantum numbers (n, 𝓁): the radial number n and the azimuthal number 𝓁 (or the topological charge (TС) of the vortex carried by the LG beam), is unstable with respect to weak perturbations. This is not difficult to see if we decompose the complex amplitude of the LG beam in terms of Hermite–Gauss modes (HG), with the total number of HG modes being equal to N = 2n +𝓁 + 1. If we now slightly change the amplitudes and phases of each HG mode, then the structure of the LG beam radically changes. Such a combination of modes is called a structured LG beam (sLG), which can carry large additional arrays of information embedded in the sLG beam by encoding the amplitudes and phases of the HG modes (excitation of modes). But as soon as a perturbation is inserted into the LG beam, its orbital angular momentum (OAM) can change dramatically in such a way that the value of the OAM changes in the interval (–𝓁, 𝓁), and the total TC – in the interval (–2n – 𝓁, 2n + 𝓁). At n = 0, the OAM changes smoothly in the interval (–𝓁, 𝓁), however it is worth "turning on" the radial number n, as the OAM oscillations occur. The number of minima (maxima) of the oscillations is equal to the radial number n in the interval θ = (0, π) and θ = (π, 2π), with their amplitude nonlinearly depending on the difference 𝓁 – n, except for the point θ = π, where the structured beam becomes degenerate. If 𝓁 = 0, then the OAM is zero, so that in the sLG beam structure, we observe either a symmetrical array of vortices with opposite-sign TCs or a pattern of edge dislocations, the number of which is equal to the radial number n. We also found that, despite the fast oscillations of the OAM, the absolute value of the total TC of the sLG beam does not change with variation of both the amplitude ε and phase θ parameters, but depends solely on the initial state (n, 𝓁) of the LG beam and modulo (2n + 𝓁).

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涡旋模的径向数能控制轨道角动量吗?

一般来说，一个标准的拉盖尔-高斯(LG)光束，其状态由两个量子数(n，𝓁)给出:径向数n和方位数𝓁(或LG光束携带的涡旋的拓扑电荷(TС))，相对于弱扰动是不稳定的。如果我们将LG光束的复振幅分解为厄米-高斯模式(HG)，这就不难看出，HG模式的总数等于N = 2n +𝓁+ 1。如果我们现在稍微改变每个HG模式的振幅和相位，那么LG光束的结构就会发生根本性的变化。这种模式的组合被称为结构化LG光束(sLG)，它可以通过编码HG模式的振幅和相位(模式激发)来携带嵌入sLG光束中的大量附加信息阵列。但是，一旦在LG束流中插入扰动，它的轨道角动量(OAM)就会发生巨大的变化，以至于OAM的值在区间(-𝓁，𝓁)和总TC -在区间(- 2n -𝓁，2n +𝓁)中发生变化。在n = 0时，OAM在区间(-𝓁，𝓁)中平稳变化，但是当OAM振荡发生时，值得“打开”径向数n。在θ = (0， π)和θ = (π， 2π)区间内，振荡的极小值(最大值)的个数等于径向数n，其振幅非线性地依赖于差分𝓁- n，除了点θ = π，在那里结构梁变得简并。如果𝓁= 0,那么OAM是零,所以sLG梁结构,我们观察一个对称的涡旋阵列与反号TCs或混乱的模式优势,的数量等于径向n。我们还发现,尽管OAM的快速振荡的绝对值的总TC sLG梁与振幅的变化不会改变ε和相位参数θ,但仅仅取决于初始状态(n,(𝓁)和模量(2n +𝓁)。

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

Accounts of Chemical Research 化学-化学综合

CiteScore

31.40

自引率

1.10%

发文量

312

审稿时长

2 months

期刊介绍： Accounts of Chemical Research presents short, concise and critical articles offering easy-to-read overviews of basic research and applications in all areas of chemistry and biochemistry. These short reviews focus on research from the author’s own laboratory and are designed to teach the reader about a research project. In addition, Accounts of Chemical Research publishes commentaries that give an informed opinion on a current research problem. Special Issues online are devoted to a single topic of unusual activity and significance. Accounts of Chemical Research replaces the traditional article abstract with an article "Conspectus." These entries synopsize the research affording the reader a closer look at the content and significance of an article. Through this provision of a more detailed description of the article contents, the Conspectus enhances the article's discoverability by search engines and the exposure for the research.