用于约瑟夫森结建模的结构保持指数时差法

IF 2.9 2区数学 Q1 MATHEMATICS, APPLIED

Applied Mathematics Letters Pub Date : 2024-11-19 DOI:10.1016/j.aml.2024.109387

Fiona McIntosh, Lily Amirzadeh, Brian E. Moore

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引用次数: 0

摘要

与其他众所周知的常用方法相比，显式、共形交映、指数时间差（ETD）方法具有众多优势，包括结构保留、稳定性高、易于实施和计算效率高。此类方法通过使用简单的一阶方案，利用组成技术构建出具有二阶和四阶精度的方法。在约瑟夫森结建模方面，与其他常用方法相比，这些 ETD 方案在效率和精确度之间实现了最佳平衡。

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Structure-preserving exponential time differencing methods for modeling Josephson Junctions

Explicit, conformal symplectic, exponential time differencing (ETD) methods have numerous advantages over other well-known and commonly used methods, including structure-preservation, high stability, ease of implementation, and computational efficiency. Such methods are constructed with second and fourth order accuracy through composition techniques using a simple first order scheme. For modeling Josephson Junctions, these ETD schemes regularly exhibit the best balance of efficiency and accuracy when compared to other commonly used methods.

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来源期刊

Applied Mathematics Letters 数学-应用数学

CiteScore

7.70

自引率

5.40%

发文量

347

审稿时长

10 days

期刊介绍： The purpose of Applied Mathematics Letters is to provide a means of rapid publication for important but brief applied mathematical papers. The brief descriptions of any work involving a novel application or utilization of mathematics, or a development in the methodology of applied mathematics is a potential contribution for this journal. This journal''s focus is on applied mathematics topics based on differential equations and linear algebra. Priority will be given to submissions that are likely to appeal to a wide audience.