On the size-consistency of the reduced-density-matrix method and the unitary invariant diagonal N-representability conditions

Abstract

Variational calculation of the ground state energy and its properties using the second-order reduced density matrix (2-RDM) is a promising approach for quantum chemistry. A major obstacle with this approach is that the N-representability conditions are too difficult in general. Therefore, we usually employ some approximations such as the P, Q, G, T1 and T2 conditions, for realistic calculations. The results of using these approximations and conditions in 2-RDM are comparable to those of CCSD(T). However, these conditions do not incorporate an important property; size-consistency. Size-consistency requires that energies E(A), E(B) and E(A...B) for two infinitely separated systems A, B, and their respective combined system A...B, to satisfy E(A...B) = E(A) + E(B). In this study, we show that the size-consistency can be satisfied if 2-RDM satisfies the following conditions: (i) 2-RDM is unitary invariant diagonal N-representable; (ii) 2-RDM corresponding to each subsystem is the eigenstate of the number of corresponding electrons; and (iii) 2-RDM satisfies at least one of the P, Q, G, T1 and T2 conditions.