CHARLIER POLYNOMIALS AND CHARLIER OSCILLATOR AS DISCRETE REALIZATION OF THE HARMONIC OSCILLATOR

V. V. Borzov; E. V. Damaskinskii

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CHARLIER POLYNOMIALS AND CHARLIER OSCILLATOR AS DISCRETE REALIZATION OF THE HARMONIC OSCILLATOR

机译：夏勒多项式和夏勒振荡器作为谐波振荡器的离散实现

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The Charlier polynomials are used for constructing oscillator-like systems. We introduce coherent states of the system are defined and study the main properties (in particular, the (over)completeness property). We show that the coherent states on the associated uncertainty relation take the minimum value. In the case under consideration, the Mandel parameter vanishes, which corresponds to the Poisson statistics of quasiexcitation spectrum for the considered oscillator.

机译：Charlier多项式用于构造类似振荡器的系统。我们介绍定义系统的相干状态并研究其主要属性（特别是（过度）完备性）。我们证明相关不确定性关系上的相干态取最小值。在所考虑的情况下，Mandel参数消失了，这对应于所考虑的振荡器的准激发光谱的泊松统计。

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《Journal of Mathematical Sciences》 |2005年第5期|p.3161-3176|共16页
作者
V. V. Borzov; E. V. Damaskinskii;
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中图分类数学;
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入库时间 2022-08-18 03:28:56

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CHARLIER POLYNOMIALS AND CHARLIER OSCILLATOR AS DISCRETE REALIZATION OF THE HARMONIC OSCILLATOR

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