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Ensemble Reduced Density Matrix Functional Theory for Excited States and Hierarchical Generalization of Pauli’s Exclusion Principle

Christian Schilling, Stefano Pittalis

2021Physical Review Letters50 citationsDOIOpen Access PDF

Abstract

We propose and work out a reduced density matrix functional theory (RDMFT) for calculating energies of eigenstates of interacting many-electron systems beyond the ground state. Various obstacles which historically have doomed such an approach to be unfeasible are overcome. First, we resort to a generalization of the Ritz variational principle to ensemble states with fixed weights. This in combination with the constrained search formalism allows us to establish a universal functional of the one-particle reduced density matrix. Second, we employ tools from convex analysis to circumvent the too involved N-representability constraints. Remarkably, this identifies Valone's pioneering work on RDMFT as a special case of convex relaxation and reveals that crucial information about the excitation structure is contained in the functional's domain. Third, to determine the crucial latter object, a methodology is developed which eventually leads to a generalized exclusion principle. The corresponding linear constraints are calculated for systems of arbitrary size.

Topics & Concepts

Pauli exclusion principleEigenvalues and eigenvectorsVariational principleDensity matrixGeneralizationDensity functional theoryMathematicsStatistical physicsApplied mathematicsPhysicsQuantum mechanicsMathematical analysisQuantumMolecular Junctions and NanostructuresAdvanced Chemical Physics StudiesOrganic and Molecular Conductors Research
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