用于解决周期和轨道量子化学问题的相位拟合三步二阶 BDF 方法系列

IF 1.7 3区 化学 Q3 CHEMISTRY, MULTIDISCIPLINARY Journal of Mathematical Chemistry Pub Date : 2024-04-30 DOI:10.1007/s10910-024-01619-3
Hosein Saadat, Sanaz Hami Hassan Kiyadeh, Ramin Goudarzi Karim, Ali Safaie
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引用次数: 0

摘要

在本文中,我们介绍了一系列新颖的二阶后向微分公式(BDFs),专门用于解决轨道解的初值问题(IVPs)数值解析中的相位滞后及其一阶导数问题。我们的方法首先是深入分析与二阶 BDF 相关的相位滞后现象。随后,我们通过将代数函数嵌入三步二阶 BDF(SOBDF)方法的运行框架,构建了一套方程。此外,我们还详细阐述了精确描述相位滞后及其导数的方程,并将重点放在三步 SOBDF 方法上。这项工作的高潮是介绍六种不同的方法,每种方法都经过精心设计,在数值计算中否定相位滞后及其导数的实数和虚数元素。在研究过程中,我们对所介绍的六种相位拟合方法的局部截断误差和稳定区域进行了细致的检查。此外,我们还通过在一系列初值问题中使用这些方法,仔细检查了它们的计算性能,为了解它们在不同情况下的有效性提供了宝贵的见解。
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Family of phase fitted 3-step second-order BDF methods for solving periodic and orbital quantum chemistry problems

In this paper, we introduce a novel series of second-order Backward Differentiation Formulas (BDFs) specifically designed to address phase-lag and its first derivative in the numerical resolution of Initial Value Problems (IVPs) with orbital solutions. Our methodology commences with an in-depth analysis of phase-lag phenomena associated with second-order BDFs. Following this, we construct a suite of equations by embedding algebraic functions into the operational framework of the 3-step second-order BDF (SOBDF) method. Additionally, we elaborate on equations that precisely describe the phase-lag and its derivatives, with a concentrated focus on the 3-step SOBDF method. The culmination of this work is the presentation of six distinct methods, each methodically crafted to negate both the real and imaginary elements of phase-lag and its derivatives in numerical computations. The study advances with a meticulous examination of the local truncation error and the stability regions pertinent to the six phase-fitted methods introduced. Furthermore, we scrutinize their computational performance by deploying these methods across a spectrum of initial value problems, offering valuable insights into their effectiveness in varying contexts.

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来源期刊
Journal of Mathematical Chemistry
Journal of Mathematical Chemistry 化学-化学综合
CiteScore
3.70
自引率
17.60%
发文量
105
审稿时长
6 months
期刊介绍: The Journal of Mathematical Chemistry (JOMC) publishes original, chemically important mathematical results which use non-routine mathematical methodologies often unfamiliar to the usual audience of mainstream experimental and theoretical chemistry journals. Furthermore JOMC publishes papers on novel applications of more familiar mathematical techniques and analyses of chemical problems which indicate the need for new mathematical approaches. Mathematical chemistry is a truly interdisciplinary subject, a field of rapidly growing importance. As chemistry becomes more and more amenable to mathematically rigorous study, it is likely that chemistry will also become an alert and demanding consumer of new mathematical results. The level of complexity of chemical problems is often very high, and modeling molecular behaviour and chemical reactions does require new mathematical approaches. Chemistry is witnessing an important shift in emphasis: simplistic models are no longer satisfactory, and more detailed mathematical understanding of complex chemical properties and phenomena are required. From theoretical chemistry and quantum chemistry to applied fields such as molecular modeling, drug design, molecular engineering, and the development of supramolecular structures, mathematical chemistry is an important discipline providing both explanations and predictions. JOMC has an important role in advancing chemistry to an era of detailed understanding of molecules and reactions.
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