在子系统密度泛函理论中开发轨道相关的非附加动能校正器

Larissa Sophie Eitelhuber, Denis G. Artiukhin
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引用次数: 0

摘要

我们提出了一条在子系统密度函数理论中构建具有成本效益的非加成动能半经验近似值的新途径。所开发的方法基于使用由非正交 Kohn$unicode{x2013}$Sham 类轨道组成的 Slaterdeterminants 来评估动能期望值,并将分子轨道重叠矩阵的逆向扩展为诺伊曼数列。应用这些技术,我们推导并实现了一系列与轨道相关的非相加动能近似值,这些近似值可以自洽地使用。我们的原理验证计算证明了势能曲线和电荷量的定量结果是正确的,并暗示了引入的经验参数适用于不同类型的分子体系和分子间相互作用。因此,我们得出结论,本研究是朝着构建适用于大分子体系的准确、高效的非相加动能轨道近似值迈出的重要一步。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Developing Orbital-Dependent Corrections for the Non-Additive Kinetic Energy in Subsystem Density Functional Theory
We present a novel route to constructing cost-efficient semi-empirical approximations for the non-additive kinetic energy in subsystem density functional theory. The developed methodology is based on the use of Slater determinants composed of non-orthogonal Kohn$\unicode{x2013}$Sham-like orbitals for the evaluation of kinetic energy expectation values and the expansion of the inverse molecular-orbital overlap matrix into a Neumann series. Applying these techniques, we derived and implemented a series of orbital-dependent approximations for the non-additive kinetic energy, which are employed self-consistently. Our proof-of-principle computations demonstrated quantitatively correct results for potential energy curves and electron densities and hinted on the applicability of the introduced empirical parameters to different types of molecular systems and intermolecular interactions. We therefore conclude that the presented study is an important step towards constructing accurate and efficient orbital-dependent approximations for the non-additive kinetic energy applicable to large molecular systems.
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