Controllable precision of the projective truncation approximation for Green's functions  

作　　者：Peng Fan Ning-Hua Tong 范鹏;同宁华(Department of Physics, Renmin University of China)

机构地区：[1]Department of Physics, Renmin University of China

出　　处：《Chinese Physics B》2019年第4期317-325,共9页中国物理B（英文版）

基　　金：Project supported by the National Key Basic Research Program of China(Grant No.2012CB921704);the National Natural Science Foundation of China(Grant No.11374362);the Fundamental Research Funds for the Central Universities;the Research Funds of Renmin University of China(Grant No.15XNLQ03)

摘　　要：Recently, we developed the projective truncation approximation for the equation of motion of two-time Green's functions(Fan et al., Phys. Rev. B 97, 165140(2018)). In that approximation, the precision of results depends on the selection of operator basis. Here, for three successively larger operator bases, we calculate the local static averages and the impurity density of states of the single-band Anderson impurity model. The results converge systematically towards those of numerical renormalization group as the basis size is enlarged. We also propose a quantitative gauge of the truncation error within this method and demonstrate its usefulness using the Hubbard-I basis. We thus confirm that the projective truncation approximation is a method of controllable precision for quantum many-body systems.Recently, we developed the projective truncation approximation for the equation of motion of two-time Green's functions(Fan et al., Phys. Rev. B 97, 165140(2018)). In that approximation, the precision of results depends on the selection of operator basis. Here, for three successively larger operator bases, we calculate the local static averages and the impurity density of states of the single-band Anderson impurity model. The results converge systematically towards those of numerical renormalization group as the basis size is enlarged. We also propose a quantitative gauge of the truncation error within this method and demonstrate its usefulness using the Hubbard-I basis. We thus confirm that the projective truncation approximation is a method of controllable precision for quantum many-body systems.

关 键 词：PROJECTIVE TRUNCATION APPROXIMATION two-time Green’s functions SINGLE-BAND ANDERSON impurity model numerical RENORMALIZATION group 

分 类 号：O413.3[理学—理论物理]