Analytical Study of the Behavioral Trend of Klein-Gordon Equation in Different Potentials

American Journal of Modern Physics Pub Date : 2024-02-28 DOI:10.11648/j.ajmp.20241301.12

Emmanuel Ifeanyi Ugwu, I. H. Kevin

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Abstract

In this work, we present the analysis of behavioral trend of Klein-Gordon Equation involving potential as regards when it comes to the study of particle, it has been observed that in every case of handling of KGE with potential of any type, it is made clear here that the equation has to first off all be transformed into a particular standard differential equation with a well-known solution which appears in form of implicitly defined transcendental equation. The equation on the other hand is to be solved analytically since the exact solution is not easily attainable without the use of mathematical tool especially when it comes to the consideration of the energy eigenvalue and the corresponding wave function because the solution is also always accompanied with a normalization constant often coupled with a condition that requires an arbitrarily chosen quantum number that come up when (l=0) and so on. In general, the analysis reveals the fact that the of trend of KGE involving potential gives a good understanding in the study of inter-molecular structure, diatomic crystals, and such case that involves inter-atomic interaction which is gives very nice idea in the study of bound state in atom.

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不同电位下克莱因-戈登方程行为趋势的分析研究

在这项研究中，我们分析了涉及粒子研究的克莱因-哥顿方程（Klein-Gordon Equation）的势能行为趋势，我们发现，在处理任何类型势能的克莱因-哥顿方程（KGE）时，首先必须将该方程转化为一个特定的标准微分方程，其已知解以隐含定义的超越方程的形式出现。另一方面，该方程需要分析求解，因为如果不使用数学工具，就很难得到精确的解，特别是在考虑能量特征值和相应的波函数时，因为解总是伴随着一个归一化常数，通常还加上一个条件，要求在（l=0）时出现一个任意选择的量子数，等等。总之，分析表明，涉及势的 KGE 趋势在研究分子间结构、双原子晶体和涉及原子间相互作用的情况时能很好地理解，这在研究原子束缚态时提供了很好的思路。

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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American Journal of Modern Physics

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