Qin, X., & Hirata, S. (2023). Finite-temperature many-body perturbation theory for anharmonic vibrations: Recursions, algebraic reduction, second-quantized reduction, diagrammatic rules, linked-diagram theorem, finite-temperature self-consistent field, and general-order algorithm. The Journal of chemical physics, 159(8), . https://doi.org/10.1063/5.0164326
Chicago Style (17th ed.) CitationQin, Xiuyi, and So Hirata. "Finite-temperature Many-body Perturbation Theory for Anharmonic Vibrations: Recursions, Algebraic Reduction, Second-quantized Reduction, Diagrammatic Rules, Linked-diagram Theorem, Finite-temperature Self-consistent Field, and General-order Algorithm." The Journal of Chemical Physics 159, no. 8 (2023). https://doi.org/10.1063/5.0164326.
MLA (9th ed.) CitationQin, Xiuyi, and So Hirata. "Finite-temperature Many-body Perturbation Theory for Anharmonic Vibrations: Recursions, Algebraic Reduction, Second-quantized Reduction, Diagrammatic Rules, Linked-diagram Theorem, Finite-temperature Self-consistent Field, and General-order Algorithm." The Journal of Chemical Physics, vol. 159, no. 8, 2023, https://doi.org/10.1063/5.0164326.