6533b85efe1ef96bd12c08c0
RESEARCH PRODUCT
Analytic high-order Douglas–Kroll–Hess electric field gradients
Roland LindhRemigius MastalerzMarkus ReiherGiampaolo Baronesubject
Classical mechanicsChemistryOperator (physics)Convergence (routing)General Physics and AstronomyApplied mathematicsUnitary matrixLimit (mathematics)Perturbation theory (quantum mechanics)Physical and Theoretical ChemistryUnitary transformationParametrizationBasis setdescription
In this work we present a comprehensive study of analytical electric field gradients in hydrogen halides calculated within the high-order Douglas-Kroll-Hess (DKH) scalar-relativistic approach taking picture-change effects analytically into account. We demonstrate the technical feasibility and reliability of a high-order DKH unitary transformation for the property integrals. The convergence behavior of the DKH property expansion is discussed close to the basis set limit and conditions ensuring picture-change-corrected results are determined. Numerical results are presented, which show that the DKH property expansion converges rapidly toward the reference values provided by four-component methods. This shows that in closed-shell cases, the scalar-relativistic DKH(2,2) approach which is of second order in the external potential for both orbitals and property operator yields a remarkable accuracy. As a parameter-dependence-free high-order DKH model, we recommend DKH(4,3). Moreover, the effect of a finite-nucleus model, different parametrization schemes for the unitary matrices, and the reliability of standard basis sets are investigated.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2007-01-01 |