New Insights and Horizons from the Linear Response Function in Conceptual DFT

Stuyver, Thijs; Proft, Frank De; Fias, Stijn; Ayers, Paul W.; Geerlings, Pau̧l

doi:10.5772/intechopen.80280

Cited by 9 publications

(7 citation statements)

References 72 publications

(100 reference statements)

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“…23,24 The most straightforward -first-order-case of a response function for a v  perturbation is the electron density   expansion involves the response function, commonly called the Linear Response Function (LRF). [23][24][25][26] At first sight tricky to evaluate and interpret, significant progress has been made in recent years in its evaluation and representation, in extracting chemical information (e.g. inductive and mesomeric effects, (anti)aromaticity) from it, 25,26 in exploring its analogies with macroscopic chemical thermodynamics 27 and its connection with molecular conductivity.…”

Section: Iintroductionmentioning

confidence: 99%

“…[23][24][25][26] At first sight tricky to evaluate and interpret, significant progress has been made in recent years in its evaluation and representation, in extracting chemical information (e.g. inductive and mesomeric effects, (anti)aromaticity) from it, 25,26 in exploring its analogies with macroscopic chemical thermodynamics 27 and its connection with molecular conductivity. 28,29 The link between LRF and the above-mentioned alchemical derivatives is easily seen.…”

Section: Iintroductionmentioning

confidence: 99%

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Exploring chemical space with alchemical derivatives: alchemical transformations of H through Ar and their ions as a proof of concept

Balawender

Lesiuk

Proft

et al. 2019

Phys. Chem. Chem. Phys.

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Section: Iintroductionmentioning

confidence: 99%

Section: Iintroductionmentioning

confidence: 99%

Exploring chemical space with alchemical derivatives: alchemical transformations of H through Ar and their ions as a proof of concept

Balawender

Lesiuk

Proft

et al. 2019

Phys. Chem. Chem. Phys.

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“…Apart from the explicit calculations of the eigenmodes for model functionals, the eigenmodes of the hardness kernel could be computed from the Kohn−Sham orbitals by following the method proposed by the Geerlings group for the numerical computation of the polarizability density kernel. 6,37 The main idea developed by the authors is to apply a set of perturbations to the system and to expand the response in a finite basis set. It is worth noting that this method allows a straightforward study of the polarization modes by diagonalizing the kernel χ 1 computed numerically in ref 6 For the numerical calculation of the hardness kernel, we can follow exactly similar lines than those in ref 6.…”

Section: And the Normalization Constant Ismentioning

confidence: 99%

Variational Principle for Eigenmodes of Reactivity in Conceptual Density Functional Theory

Senet

2020

ACS Omega

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In conceptual density functional theory, reactivity indexes as the Fukui function, the global hardness/softness, and hardness/softness kernels are fundamental linear responses extensively studied to predict the nucleophilic and electrophilic propensities of atoms in molecules. We demonstrate that the hardness/softness kernels of an isolated system can be expanded in eigenmodes, solutions of a variational principle. These modes are divided into two groups: the polarization modes and the charging modes. The eigenvectors of the polarization modes are orthogonal to the Fukui function and can be interpreted as densities induced at a constant chemical potential. The charging modes of an isolated system are associated with virtual charge transfers weighted by the Fukui function and obey an exact nontrivial sum rule. The exact relation between these charging eigenmodes and those of the polarizability kernel is established. The physical interpretation of the modes is discussed. Applications of the present findings to the Thomas–Fermi and von Weizacker kinetic energy functionals are presented. For a confined free quantum gas, described by the von Weizacker kinetic energy functional, we succeed to derive an approximate analytical solution for the Fukui function and for hardness/softness and polarizability kernels. Finally, we indicate how numerical calculations of the hardness kernel of a molecule could be performed from the Kohn–Sham orbitals.

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“…Этот поход, развитый Парром и названный им Conceptual DFT, имеет много сторонников в современной квантовой химии, но мы на нем не будем останавливаться. Несколько иные акценты, идейно больше связанные со статьями Коулсона, даются в теории DFT-функций линейного отклика [55]. В цитируемом обзоре Геерлинга и сотр.…”

Section: эффекты возмущения в альтернантных системахunclassified

Parity symmetry in a number of problems of quantum and structural chemistry

Luzanov

2019

Chemical Series

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A synthetic review and new results are given of the alternant symmetry theory and its applications within a unified approach. It is based on J–symmetry (parity) operators. Unlike usual commutation rules, these symmetry operators anticommute with Hamiltonians or other relevant quantities. In the J–symmetry terms we treat a variety of problems and topics, mainly related to π-shells of conjugated molecules. In particular, various orbital theories are outlined with a systematic use of block-matrix technique (density matrices, operator functions etc.). Noval π‑models and their J–symmetry are studied within the current context of single-molecule conductance and the relevant problems concerning Green’s function and electron transmission evaluation. We stress on the key importance of account for π-electron correlation for describing correctly transmission π-spectra. We discuss electron-structure peculiarities of alternant radical states and the validity of the Lieb-Ovchinnikov spin rule resulting from the J–symmetry and electron correlation effects. It is shown how the simplified (based on Hückel’s MOs) spin-polarized theory provides a correct number of effectively unpaired electrons in polyradicaloid alternant molecules. Another type of problems is concerned with chirality (generllly, structural asymmetry) problems. By spectral analysys of the previously defined chirality operator we could reinterpret the problem in terms of J–symmetry. It allowed us to construct here the noval chirality operator which is nonnegative definite and vanishes on achiral structures. Its simplest invariant, the matrix trace, surves us as a quantitative measure of the structural (electronic) chirality. Preliminary calculations tell us that the new chirality index behaves reasonably even for the difficult (high-symmetry) chiral systems.

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New Insights and Horizons from the Linear Response Function in Conceptual DFT

Cited by 9 publications

References 72 publications

Exploring chemical space with alchemical derivatives: alchemical transformations of H through Ar and their ions as a proof of concept

Exploring chemical space with alchemical derivatives: alchemical transformations of H through Ar and their ions as a proof of concept

Variational Principle for Eigenmodes of Reactivity in Conceptual Density Functional Theory

Parity symmetry in a number of problems of quantum and structural chemistry

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