Litcius/Paper detail

Multistate Density Functional Theory of Excited States

Yangyi Lu, Jiali Gao

2022The Journal of Physical Chemistry Letters57 citationsDOI

Abstract

We report a rigorous formulation of density functional theory for excited states, providing a theoretical foundation for a multistate density functional theory. We prove the existence of a Hamiltonian matrix functional H[D] of the multistate matrix density D(r) in the subspace spanned by the lowest N eigenstates. Here, D(r) is an N-dimensional matrix of state densities and transition densities. Then, a variational principle of the multistate subspace energy is established, whose minimization yields both the energies and densities of the individual N eigenstates. Furthermore, we prove that the N-dimensional matrix density D(r) can be sufficiently represented by N2 nonorthogonal Slater determinants, based on which an interacting active space is introduced for practical calculations. This work establishes that the ground and excited states can be treated on an equal footing in density functional theory.

Topics & Concepts

Eigenvalues and eigenvectorsDensity functional theoryExcited stateSubspace topologyHamiltonian (control theory)Density matrixQuantum mechanicsPhysicsEnergy functionalWork (physics)Matrix (chemical analysis)Space (punctuation)Variational principleGround stateComplete active spaceMathematical physicsMathematicsChemistryMathematical analysisComputer scienceMathematical optimizationQuantumBasis setChromatographyOperating systemAdvanced Chemical Physics StudiesMolecular Junctions and NanostructuresSpectroscopy and Quantum Chemical Studies