Abstract
Crossings between states involve complex electronic structures, making the accurate characterization of the crossing point difficult. In this study, the analytic derivatives
of three complete active space second-order perturbation theory (CASPT2) variants as well as an extension of the restricted active space are developed. These variants
are applied to locating minimum energy conical intersections. Our results demonstrate that the three CASPT2 variants predict qualitatively similar results, but a recently developed variant, the rotated multistate CASPT2 (RMS-CASPT2), is least sensitive to the number of states considered in the calculation. We demonstrate that CASPT2 and the reference self-consistent field calculations predict qualitatively different energetics and bond lengths.
Supplementary materials
Title
Supporting Information: Analytic First-Order Derivatives of (X)MS-, XDW-, and RMS-CASPT2 Methods
Description
Supporting Information
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