Accurate van der Waals coefficients from density functional theory

Tao, Jianmin; Perdew, John P.; Ruzsinszky, Adrienn

doi:10.1073/pnas.1118245108

Cited by 97 publications

(109 citation statements)

References 54 publications

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“…This model was later extended to describe higher-multipole coefficients as well. 222 In the context of general vdW methods, this model is not fully complete, as the C 6 coefficient model is not combined with a damping function, and still requires a prescription for the input static polarizability. However, such a generalization could be obtained in a straightforward manner, for example with the approach used in the XDM or TS methods, and hence we chose to present this model to illustrate the flexibility with which density-functional models for the local effective polarizability can be constructed.…”

Section: Chemical Reviewsmentioning

confidence: 99%

First-Principles Models for van der Waals Interactions in Molecules and Materials: Concepts, Theory, and Applications

2017

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Noncovalent van der Waals (vdW) or dispersion forces are ubiquitous in nature and influence the structure, stability, dynamics, and function of molecules and materials throughout chemistry, biology, physics, and materials science. These forces are quantum mechanical in origin and arise from electrostatic interactions between fluctuations in the electronic charge density. Here, we explore the conceptual and mathematical ingredients required for an exact treatment of vdW interactions, and present a systematic and unified framework for classifying the current first-principles vdW methods based on the adiabatic-connection fluctuation−dissipation (ACFD) theorem (namely the Rutgers−Chalmers vdW-DF, Vydrov−Van Voorhis (VV), exchange-hole dipole moment (XDM), Tkatchenko−Scheffler (TS), many-body dispersion (MBD), and random-phase approximation (RPA) approaches). Particular attention is paid to the intriguing nature of many-body vdW interactions, whose fundamental relevance has recently been highlighted in several landmark experiments. The performance of these models in predicting binding energetics as well as structural, electronic, and thermodynamic properties is connected with the theoretical concepts and provides a numerical summary of the state-of-the-art in the field. We conclude with a roadmap of the conceptual, methodological, practical, and numerical challenges that remain in obtaining a universally applicable and truly predictive vdW method for realistic molecular systems and materials.

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Section: Chemical Reviewsmentioning

confidence: 99%

First-Principles Models for van der Waals Interactions in Molecules and Materials: Concepts, Theory, and Applications

2017

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“…[45][46][47][48][49][50][51][65][66][67][68][69][70][71][72][73] a) Electronic mail: angelos.michaelides@ucl.ac.uk Understanding the role of vdW forces in water has been greatly helped by the emergence of various approaches which account for vdW forces within the framework of DFT. [74][75][76][77][78][79][80][81][82][83] In the last few years, many of the vdW inclusive DFT xc functionals have been used to investigate the effects of vdW on the structural, energetic, and vibrational properties of liquid water. [65][66][67][68][69][70][71][72][73] Overall, with vdW inclusive xc functionals there are indeed improvements in certain calculated properties of liquid water.…”

Section: Introductionmentioning

confidence: 99%

On the accuracy of van der Waals inclusive density-functional theory exchange-correlation functionals for ice at ambient and high pressures

Santra¹,

Klimeš²,

Tkatchenko³

et al. 2013

The Journal of Chemical Physics

130

174

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On the accuracy of van der Waals inclusive density-functional theory exchange-correlation functionals for ice at ambient and high pressures Density-functional theory (DFT) has been widely used to study water and ice for at least 20 years. However, the reliability of different DFT exchange-correlation (xc) functionals for water remains a matter of considerable debate. This is particularly true in light of the recent development of DFT based methods that account for van der Waals (vdW) dispersion forces. Here, we report a detailed study with several xc functionals (semi-local, hybrid, and vdW inclusive approaches) on ice Ih and six proton ordered phases of ice. Consistent with our previous study [B. Santra, J. Klimeš, D. Alfè, A. Tkatchenko, B. Slater, A. Michaelides, R. Car, and M. Scheffler, Phys. Rev. Lett. 107, 185701 (2011)] which showed that vdW forces become increasingly important at high pressures, we find here that all vdW inclusive methods considered improve the relative energies and transition pressures of the high-pressure ice phases compared to those obtained with semi-local or hybrid xc functionals. However, we also find that significant discrepancies between experiment and the vdW inclusive approaches remain in the cohesive properties of the various phases, causing certain phases to be absent from the phase diagram. Therefore, room for improvement in the description of water at ambient and high pressures remains and we suggest that because of the stern test the high pressure ice phases pose they should be used in future benchmark studies of simulation methods for water. © 2013 AIP Publishing LLC. [http://dx

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“…In the classical electrodynamics picture where nonlocality is neglected, the fluctuating surface charges are located precisely on the surface and these infinitely compressed charges result in the unphysically divergent van der Waals force (1,29). In a more realistic framework, considering the inherent quantum nature of electrons, the surface charges are intrinsically smeared across the boundary in a subnanometer layer (7,(20)(21)(22), which dramatically alters the van der Waals energy in the small gap limit (30)(31)(32)(33). Due to the complexity introduced by nonlocality, its influence on the van der Waals force in 3D geometries has never been described appropriately.…”

mentioning

confidence: 99%

van der Waals interactions at the nanoscale: The effects of nonlocality

Luo

Zhao

Pendry

2014

Proc. Natl. Acad. Sci. U.S.A.

107

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Calculated using classical electromagnetism, the van der Waals force increases without limit as two surfaces approach. In reality, the force saturates because the electrons cannot respond to fields of very short wavelength: polarization charges are always smeared out to some degree and in consequence the response is nonlocal. Nonlocality also plays an important role in the optical spectrum and distribution of the modes but introduces complexity into calculations, hindering an analytical solution for interactions at the nanometer scale. Here, taking as an example the case of two touching nanospheres, we show for the first time, to our knowledge, that nonlocality in 3D plasmonic systems can be accurately analyzed using the transformation optics approach. The effects of nonlocality are found to dramatically weaken the field enhancement between the spheres and hence the van der Waals interaction and to modify the spectral shifts of plasmon modes.van der Waals | nonlocality | transformation optics | plasmonics T he van der Waals force is an electromagnetic interaction between correlated fluctuating charges on two electrically neutral surfaces (1-4). As the surfaces approach more closely, the force increases as fluctuations of shorter and shorter length scale come into play, but ultimately the force will saturate when the surfaces are so close that the even shortest wavelength charge fluctuations are included. It is this saturation with which we are concerned in this paper and to treat it, we need to go beyond the conventional description of a solid by a permittivity, «ðωÞ, that depends only on the frequency, ω. Here we recognize that the response of a solid depends on the length scale of the fluctuations and introduce a formalism using a generalized nonlocal permittivity, «ðω; kÞ (5-13), that also depends on the wave vector, k, and hence takes into account the saturation. Neglect of nonlocality leads to an unphysical diverging van der Waals force at short distances. We apply the technique of transformation optics (14-16) to solve the difficult problem of including nonlocal effects when two nanoscale bodies interact and illustrate our theory with calculations for two closely spaced nanospheres.Ultimately at a few tenths of a nanometer, just before the surfaces touch, direct contact of the charges will come into play through electron tunneling (17-25); in other words, chemical bonding will dominate the final approach. Here we are not concerned with chemical bonding, which is extensively treated elsewhere in the literature.The van der Waals force is weaker than chemical bonding effects, but plays an important role in a broad range of areas, such as surface and colloidal science, nanoelectromechanical systems, and nanotechnology (2,3,(26)(27)(28). In the classical electrodynamics picture where nonlocality is neglected, the fluctuating surface charges are located precisely on the surface and these infinitely compressed charges result in the unphysically divergent van der Waals force (1, 29). In a more realistic framework,...

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Accurate van der Waals coefficients from density functional theory

Cited by 97 publications

References 54 publications

First-Principles Models for van der Waals Interactions in Molecules and Materials: Concepts, Theory, and Applications

First-Principles Models for van der Waals Interactions in Molecules and Materials: Concepts, Theory, and Applications

On the accuracy of van der Waals inclusive density-functional theory exchange-correlation functionals for ice at ambient and high pressures

van der Waals interactions at the nanoscale: The effects of nonlocality

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