计算克莱因-戈登频谱

IF 2.3 2区数学 Q1 MATHEMATICS, APPLIED

IMA Journal of Numerical Analysis Pub Date : 2024-08-26 DOI:10.1093/imanum/drae032

Frank Rösler, Christiane Tretter

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引用次数: 0

摘要

我们在可解复杂性指数层次结构框架内研究了克莱因-戈登方程特征值问题的计算复杂性。我们证明，具有线性衰减势的克莱因-哥顿方程的特征值可以在单一极限内计算，并保证误差范围在以上。该证明是构造性的，即我们获得了一种可以在计算机上实现的数值算法。此外，我们还证明了克莱因-戈登方程点谱的抽象封闭，并将我们的数值结果与这些封闭进行了比较。最后，我们将实现的算法和我们的抽象封闭应用于几种与物理相关的势，如萨特势和尖顶势，并提供了收敛性和误差分析。

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Computing Klein-Gordon Spectra

We study the computational complexity of the eigenvalue problem for the Klein–Gordon equation in the framework of the Solvability Complexity Index Hierarchy. We prove that the eigenvalue of the Klein–Gordon equation with linearly decaying potential can be computed in a single limit with guaranteed error bounds from above. The proof is constructive, i.e. we obtain a numerical algorithm that can be implemented on a computer. Moreover, we prove abstract enclosures for the point spectrum of the Klein–Gordon equation and we compare our numerical results to these enclosures. Finally, we apply both the implemented algorithm and our abstract enclosures to several physically relevant potentials such as Sauter and cusp potentials and we provide a convergence and error analysis.

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来源期刊

IMA Journal of Numerical Analysis 数学-应用数学

CiteScore

5.30

自引率

4.80%

发文量

审稿时长

6-12 weeks

期刊介绍： The IMA Journal of Numerical Analysis (IMAJNA) publishes original contributions to all fields of numerical analysis; articles will be accepted which treat the theory, development or use of practical algorithms and interactions between these aspects. Occasional survey articles are also published.