Atomic Partitioning of the MPn (<i>n</i>= 2, 3, 4) Dynamic Electron Correlation Energy by the Interacting Quantum Atoms Method: A Fast and Accurate Electrostatic Potential Integral Approach

Vincent, Mark A.; Silva, Arnaldo F.; Popelier, Paul L. A.

doi:10.1002/jcc.26037

Cited by 7 publications

(14 citation statements)

References 37 publications

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“…The interaction energy, V AB corr , of each atom with itself (A = B) or with one of the other atoms (A ≠ B) is obtained from the 2PDM via a 6D quadrature integration. The 3D ESP [51] approach was more recently developed with the intent of ultimate implementation in our polarizable multipolar [52] topological force field FFLUX [53][54][55][56][57], since 3D ESP is faster and more accurate when compared to the 6D approach. The master equation for the 3D ESP integration is given just below, where any derivation details are not repeated here but can be found in the selfcontained account of ref.…”

Section: Iqa Dynamic Electron Correlation Energymentioning

confidence: 99%

“…The master equation for the 3D ESP integration is given just below, where any derivation details are not repeated here but can be found in the selfcontained account of ref. [51],…”

Section: Iqa Dynamic Electron Correlation Energymentioning

confidence: 99%

“…26 is solved analytically. The AA' (or 3D ESP) approach is a very recent achievement [51]. Atoms can now be calculated 50 times faster with greater accuracy compared to the AB (or 6D) version.…”

Section: Iqa Dynamic Electron Correlation Energymentioning

confidence: 99%

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Contributions of IQA electron correlation in understanding the chemical bond and non-covalent interactions

2020

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The quantum topological energy partitioning method Interacting Quantum Atoms (IQA) has been applied for over a decade resulting in an enlightening analysis of a variety of systems. In the last three years we have enriched this analysis by incorporating into IQA the two-particle density matrix obtained from Møller-Plesset (MP) perturbation theory. This work led to a new computational and interpretational tool to generate atomistic electron correlation and thus topologically based dispersion energies. Such an analysis determines the effects of electron correlation within atoms and between atoms, which covers both bonded and non-bonded "throughspace" atom-atom interactions within a molecule or molecular complex. A series of papers published by us and other groups shows that the behavior of electron correlation is deeply ingrained in structural chemistry. Some concepts that were shown to be connected to bond correlation are bond order, multiplicity, aromaticity, and hydrogen bonding. Moreover, the concepts of covalency and ionicity were shown not to be mutually excluding but to both contribute to the stability of polar bonds. The correlation energy is considerably easier to predict by machine learning (kriging) than other IQA terms. Regarding the nature of the hydrogen bond, correlation energy presents itself in an almost contradicting way: there is much localized correlation energy in a hydrogen bond system, but its overall effect is null due to internal cancelation. Furthermore, the QTAIM delocalization index has a connection with correlation energy. We also explore the role of electron correlation in protobranching, which provides an explanation for the extra stabilization present in branched alkanes compared to their linear counterparts. We hope to show the importance of understanding the true nature of the correlation energy as the foundation of a modern representation of dispersion forces for ab initio, DFT, and force field calculations.

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Section: Iqa Dynamic Electron Correlation Energymentioning

confidence: 99%

“…The master equation for the 3D ESP integration is given just below, where any derivation details are not repeated here but can be found in the selfcontained account of ref. [51],…”

Section: Iqa Dynamic Electron Correlation Energymentioning

confidence: 99%

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Contributions of IQA electron correlation in understanding the chemical bond and non-covalent interactions

2020

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“…We have developed an approach, called ESP, whereby one of the numerical integrations given in Equation (1) is replaced by an analytical one . The latter involves integrals, reminiscent of those occurring in the calculation of the electrostatic potential, which we have generated via G09.…”

Section: Theory and Computational Detailsmentioning

confidence: 99%

A Comparison of the Interacting Quantum Atoms (IQA) Analysis of the Two‐Particle Density‐Matrices of MP4SDQ and CCSD

Vincent

Silva

Popelier

2020

Zeitschrift anorg allge chemie

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Within the quantum topological energy partitioning method called Interacting Quantum Atoms (IQA) we transition from Møller‐Plesset (MP4SDQ) to CCSD in calculating intra‐ and interatomic electron correlation energies for a set of hydrides, diatomics, a few simple molecules and non‐covalently bonded complexes, using the uncontracted basis set 6‐31++G(2d,2p). CCSD‐IQA allows a more rigorous analysis of atomic electron correlation than that offered by Møller‐Plesset, which returns IQA contributions that are identical to Hartree–Fock counterparts except for two‐electron terms. The CCSD‐IQA analysis returns bond and other interatomic correlation energies that are typically much larger in magnitude than the MP4SDQ values. Crisp patterns of energy transferability are detected in water clusters, both for intra‐atomic and interatomic correlation energies. CCSD determines that the intra‐atomic correlation energy of an oxygen drops by 15 kJ·mol–1 for donating a hydrogen and by 25 kJ·mol–1 for accepting a hydrogen.

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“…We have recently included dyanmical electron correlation in the IQA method by considering either coupled‐cluster (CC) and Hartree–Fock (HF) transition density matrices or CC Lagrangians . There have been also implementations of IQA coupled with Møller–Plesset density functions . Because dynamical correlation occupies partially most of the orbitals of the Fock space of a system, and the number of IQA two‐electron integrals scales with the fourth power of this set, IQA calculations based on post‐HF wave functions are still unfeasible for basis sets comprised of more than a few hundred orbitals.…”

Section: Introductionmentioning

confidence: 99%

Efficient implementation of the interacting quantum atoms energy partition of the second‐order Møller–Plesset energy

et al. 2020

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We describe an efficient implementation of the partition of the second-order Møller-Plesset (MP2) correlation energy within the interacting quantum atoms (IQA) energy decomposition. We simplify the IQA integration bottleneck by considering only the occupied to virtual elements of the second order reduced density matrix, a procedure that reduces substantially the size of the two-electron matrix, which has to be addressed. The algorithmic improvements described herein allow to perform the decomposition of the MP2 correlation energy for medium size molecular systems using moderate computational resources. We expect that the methods developed in this investigation will prove useful to understand electron correlation effects through a real space perspective. K E Y W O R D S electronic correlation, interacting quantum atoms, MP2

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Atomic Partitioning of the MPn (n= 2, 3, 4) Dynamic Electron Correlation Energy by the Interacting Quantum Atoms Method: A Fast and Accurate Electrostatic Potential Integral Approach

Cited by 7 publications

References 37 publications

Contributions of IQA electron correlation in understanding the chemical bond and non-covalent interactions

Contributions of IQA electron correlation in understanding the chemical bond and non-covalent interactions

A Comparison of the Interacting Quantum Atoms (IQA) Analysis of the Two‐Particle Density‐Matrices of MP4SDQ and CCSD

Efficient implementation of the interacting quantum atoms energy partition of the second‐order Møller–Plesset energy

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