4 research outputs found
ΠΠΎΠΌΠΌΡΠ½ΠΈΠΊΠ°ΡΠΈΠ²Π½ΡΠ΅ Π°ΡΠΏΠ΅ΠΊΡΡ ΡΠ·ΡΠΊΠ° ΠΈ ΠΊΡΠ»ΡΡΡΡΡ. Π§. 2
Get PDFΠ ΡΠ±ΠΎΡΠ½ΠΈΠΊΠ΅ ΡΠ°ΡΡΠΌΠ°ΡΡΠΈΠ²Π°ΡΡΡΡ Π°ΠΊΡΡΠ°Π»ΡΠ½ΡΠ΅ ΠΏΡΠΎΠ±Π»Π΅ΠΌΡ Π»Π΅ΠΊΡΠΈΠΊΠΎΠ»ΠΎΠ³ΠΈΠΈ, Π² ΡΠΎΠΌ ΡΠΈΡΠ»Π΅ ΡΡΠ°Π·Π΅ΠΎΠ»ΠΎΠ³ΠΈΠΈ, ΡΡΠ½ΠΊΡΠΈΠΎΠ½Π°Π»ΡΠ½ΡΠ΅ Π°ΡΠΏΠ΅ΠΊΡΡ ΠΊΠΎΠ³Π½ΠΈΡΠΈΠ²Π½ΡΡ
ΠΈ Π»ΠΈΠ½Π³Π²ΠΎΠΊΡΠ»ΡΡΡΡΠΎΠ»ΠΎΠ³ΠΈΡΠ΅ΡΠΊΠΈΡ
ΠΈΡΡΠ»Π΅Π΄ΠΎΠ²Π°Π½ΠΈΠΉ, Π΄ΠΈΡΠΊΡΡΡΡ, ΠΆΠ°Π½ΡΡ ΠΈ ΡΡΡΠ°ΡΠ΅Π³ΠΈΠΈ ΡΠ·ΡΠΊΠΎΠ²ΠΎΠΉ ΠΈ ΡΠ΅ΡΠ΅Π²ΠΎΠΉ ΠΊΠΎΠΌΠΌΡΠ½ΠΈΠΊΠ°ΡΠΈΠΈ. Π‘Π±ΠΎΡΠ½ΠΈΠΊ Π°Π΄ΡΠ΅ΡΠΎΠ²Π°Π½ ΠΏΡΠ΅ΠΏΠΎΠ΄Π°Π²Π°ΡΠ΅Π»ΡΠΌ Π²ΡΠ·ΠΎΠ², ΡΠΊΠΎΠ», Π»ΠΈΡΠ΅Π΅Π², Π°ΡΠΏΠΈΡΠ°Π½ΡΠ°ΠΌ, ΡΡΡΠ΄Π΅Π½ΡΠ°ΠΌ, ΠΏΡΠ°ΠΊΡΠΈΠΊΡΡΡΠΈΠΌ ΠΏΠ΅ΡΠ΅Π²ΠΎΠ΄ΡΠΈΠΊΠ°ΠΌ, Π²ΡΠ΅ΠΌ, ΠΊΠΎΠ³ΠΎ ΠΈΠ½ΡΠ΅ΡΠ΅ΡΡΠ΅Ρ ΠΌΠΈΡ ΡΠ·ΡΠΊΠΎΠ² ΠΈ ΠΊΡΠ»ΡΡΡΡ
Quantum Crystallography of Hydronium Cations
Full text linkCationic hydronium clusters of the form [HaOb]^c,(c\u3e0), have been investigated. After investigating over 2000 crystal structures containing hydronium cations found in the Cambridge Structural Database. The hydronium cationic compounds that were most unusual, mischaracterized, or those of apparent aggregates, were investigated further by geometry optimization and in some cases with the Quantum Theory of Atoms in Molecules (QTAIM). The results of our investigations yielded the first reports of stable conformations of cyclic dihydronium cationic clusters. In a second investigation we reported the first theoretically confirmed transition state of a H7O3+conformer captured within a crystal. A third product from our efforts was the theoretically viable, cubic arrangement of 3[H3O+]3[H2O]2[OH-] derived from the observed behavior of hydronium cationic clusters
Quantum crystallography, a developing area of computational chemistry extending to macromolecules
No full textN-Representability in the Quantum Kernel Energy Method
Full text linkThe Kernel Energy Method (KEM) delivers accurate full molecule energies using less computational resources than standard ab-initio quantum chemical approaches. KEM achieves this efficiency by decomposing a system of atoms into disjoint subsets called kernels. The results of full ab-initio calculations on each individual single kernel and on each double kernel formed by the union of each pair of single kernels are combined in an equation of a form that is specific to KEM to provide an approximation to the full molecule energy. KEM has been demonstrated to give accurate molecular energies over a wide range of systems, chemical methods and basis sets. The efficiency of KEM makes calculations on large systems tractable. It has been shown to be accurate for calculations on large biomolecules including proteins and DNA.
KEM has recently been generalized to provide the one-body density matrix for the full molecule. This generalization greatly expands the utility of the method since the density matrix enables simple calculation of the expectation value of any observable associated with a one-body operator. More importantly, the generalization enables results from KEM to be constrained to satisfy essential quantum mechanical conditions.
KEM is generalized to density matrices by taking the density matrices obtained from the single and double kernels and adapting them to the full molecule basis. These augmented kernel density matrices are summed according to the standard KEM expansion. This initial matrix does not necessarily correspond to a valid quantum mechanical N-electron wavefunction which is normalized and obeys the Pauli principle. Such a density matrix is called N-representable. N-representability is imposed on the initial matrix by using the Clinton equations, which deliver a single-determinant N-representable one-body density matrix. Single-determinant N-representability is ensured by enforcing the density matrix to be a normalized projector. Such normalized projectors are factorizable into matrices which deliver full molecule molecular orbitals.
Although energies have been demonstrated to be accurate in the original energy expansion form of KEM, there is no requirement that the energy corresponds to the expectation value of a valid quantum mechanical wavefunction. Because of this, there is no requirement that the energies satisfy the variational theorem. Imposing single-determinant N-representability on the KEM density matrix by using the Clinton equations recovers the variational bound on the energy obtained from KEM.
Recovery of the variational bound by the N-representable KEM density matrix has been demonstrated by calculations on several water clusters. Energies from full molecule restricted Hartree-Fock calculations were compared to energies obtained from the KEM energy expansion and to energies obtained from the KEM density matrix expansion which had N-representability imposed. In each case where the energy expansion gave energies that violated the variational bound the N-representable density matrix gave energies that satisfied the bound and in fact were more accurate than the simple energy expansion results.
The effect of imposing N-representability on the KEM density matrix has also been investigated in the context of Kohn-Sham Density Functional Theory (KS/DFT). Calculations on a simple noble gas system and a single water cluster were done. KS/DFT energies were compared to energies from the KEM energy expansion and energies associated with the KEM density matrix expansion on which N-representability was imposed. The energies from the KEM density matrix expansion made N-representable were more accurate than those obtained from straightforward KEM energy expansions in nearly all cases for the noble gas system. For the water cluster the accuracy of the energy obtained from the N-representable KEM density matrix was nearly four times closer to the energy calculated for the full system than the KEM energy expansion result.
The Clinton-purified N-representable matrix obtained from the KEM density expansion can be used to calculate expectation values for any one-electron operator. In particular, a KEM density matrix approach can be used in the study of quantum crystallography
