TY - JOUR
T1 - Dynamical configuration interaction
T2 - Quantum embedding that combines wave functions and Green's functions
AU - Dvorak, Marc
AU - Rinke, Patrick
N1 - Publisher Copyright:
© 2019 American Physical Society.
PY - 2019/3/25
Y1 - 2019/3/25
N2 - We present the concept, derivation, and implementation of dynamical configuration interaction, a quantum embedding theory that combines Green's function methodology with the many-body wave function. In a strongly correlated active space, we use full configuration interaction (CI) to describe static correlation exactly. We add energy-dependent corrections to the CI Hamiltonian which, in principle, include all remaining correlations derived from the bath space surrounding the active space. Next, we replace the exact Hamiltonian in the bath with one of excitations defined over a correlated ground state. This transformation is naturally suited to the methodology of many-body Green's functions. In this space, we use a modified GW/Bethe-Salpeter equation procedure to calculate excitation energies. Combined with an estimate of the ground-state energy in the bath, we can efficiently compute the energy-dependent corrections, which correlate the full set of orbitals, for very low computational cost. We present dimer dissociation curves for H2 and N2 in good agreement with exact results. Additionally, excited states of N2 and C2 are in excellent agreement with benchmark theory and experiment. By combining the strengths of two disciplines, we achieve a balanced description of static and dynamic correlation in a fully ab initio, systematically improvable framework.
AB - We present the concept, derivation, and implementation of dynamical configuration interaction, a quantum embedding theory that combines Green's function methodology with the many-body wave function. In a strongly correlated active space, we use full configuration interaction (CI) to describe static correlation exactly. We add energy-dependent corrections to the CI Hamiltonian which, in principle, include all remaining correlations derived from the bath space surrounding the active space. Next, we replace the exact Hamiltonian in the bath with one of excitations defined over a correlated ground state. This transformation is naturally suited to the methodology of many-body Green's functions. In this space, we use a modified GW/Bethe-Salpeter equation procedure to calculate excitation energies. Combined with an estimate of the ground-state energy in the bath, we can efficiently compute the energy-dependent corrections, which correlate the full set of orbitals, for very low computational cost. We present dimer dissociation curves for H2 and N2 in good agreement with exact results. Additionally, excited states of N2 and C2 are in excellent agreement with benchmark theory and experiment. By combining the strengths of two disciplines, we achieve a balanced description of static and dynamic correlation in a fully ab initio, systematically improvable framework.
UR - http://www.scopus.com/inward/record.url?scp=85064123546&partnerID=8YFLogxK
U2 - 10.1103/PhysRevB.99.115134
DO - 10.1103/PhysRevB.99.115134
M3 - Article
AN - SCOPUS:85064123546
SN - 2469-9950
VL - 99
JO - Physical Review B
JF - Physical Review B
IS - 11
M1 - 115134
ER -