English

Method For Making 2-Electron Response Reduced Density Matrices Approximately N-representable

Quantum Physics 2018-03-02 v2 Chemical Physics

Abstract

In methods like geminal-based approaches or coupled cluster that are solved using the projected Schr\"odinger equation, direct computation of the 2-electron reduced density matrix (2-RDM) is impractical and one falls back to a 2-RDM based on response theory. However, the 2-RDMs from response theory are not NN-representable. That is, the response 2-RDM does not correspond to an actual physical NN-electron wave function. We present a new algorithm for making these non-NN-representable 2-RDMs approximately NN-representable, i.e. it has the right symmetry and normalization and it fulfills the PP-, QQ- and GG-conditions. Next to an algorithm which can be applied to any 2-RDM, we have also developed a 2-RDM optimization procedure specifically for seniority-zero 2-RDMs. We aim to find the 2-RDM with the right properties that is the closest (in the sense of the Frobenius norm) to the non-N-representable 2-RDM by minimizing the square norm of the difference between the initial 2-RDM and the targeted 2-RDM under the constraint that the trace is normalized and the 2-RDM, QQ- and GG-matrices are positive semidefinite, i.e. their eigenvalues are non-negative. Our method is suitable for fixing non-N-respresentable 2-RDMs which are close to being N-representable. Through the N-representability optimization algorithm we add a small correction to the initial 2-RDM such that it fulfills the most important N-representability conditions.

Keywords

Cite

@article{arxiv.1707.01022,
  title  = {Method For Making 2-Electron Response Reduced Density Matrices Approximately N-representable},
  author = {Caitlin Lanssens and Paul W. Ayers and Dimitri Van Neck and Stijn De Baerdemacker and Klaas Gunst and Patrick Bultinck},
  journal= {arXiv preprint arXiv:1707.01022},
  year   = {2018}
}

Comments

13 pages, 8 figures

R2 v1 2026-06-22T20:37:39.028Z