Application of Runge-Kutta Numerical Methods to Solve the Schrodinger Equation for Hydrogen and Positronium Atoms

A.A. Mowlavi; A. Binesh; H. Arabshahi

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Application of Runge-Kutta Numerical Methods to Solve the Schrodinger Equation for Hydrogen and Positronium Atoms

机译：应用Runge-Kutta数值方法求解氢原子和正电子原子的薛定inger方程

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In this study, the radial Schrodinger equation for central coulomb potential using numerical Runge-Kutta has been solved. Energy eigenvalues for hydrogen and positronium bound systems is derived -13.6056 and -6.803 eV, respectively. Numerical results of ground state modes of wave functions for hydrogen and positronium R (r) and the presence probability function |rR(r)|2has been presented. These results are in good agreement with analytical calculations of the hydrogen atom in modern physics and quantum mechanics. Therefore, numerical methods can be very useful and effective in solving physical problems.

机译：在这项研究中，使用数值Runge-Kutta解决了中心库仑势的径向Schrodinger方程。氢和正电子束缚系统的能量本征值分别推导为-13.6056和-6.803 eV。给出了氢和R（r）的波函数的基态模式的数值结果以及存在概率函数| rR（r）| 2的数值结果。这些结果与现代物理学和量子力学中氢原子的分析计算非常吻合。因此，数值方法对于解决物理问题可能非常有用和有效。

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《Research Journal of Applied Sciences: RJAS》 |2010年第5期|共5页
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A.A. Mowlavi; A. Binesh; H. Arabshahi;
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机译：求解线性系统的数值方法及其在椭圆型差分方程中的应用

Application of Runge-Kutta Numerical Methods to Solve the Schrodinger Equation for Hydrogen and Positronium Atoms

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