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공공누리This item is licensed Korea Open Government License

Title
Efficient and exact computation of Hubbard and t- J models using quantum diagonalization method
Author(s)
조명원안설아
Publication Year
2009-04-01
Abstract
The quantum Monte Carlo diagonalization or stochastic diagonalization serves as a computational method of solving exactly quantum Hamiltonian models. While based on a variational method, in which the solution approaches the optimal eigenstate of a huge Hamiltonian matrix, the diagonalization method in practice has difficulty because of the rapidly increasing number of quantum states. Here, we suggest an improved implementation method of finding the ground state via exact diagonalization of the Hubbard and t- J model Hamiltonians. Achieved is a great increase in the computational capability through an optimized code based on Boolean operations, a reduction of the state space using symmetry properties, and an effective variation on the trial ground state. Our method is restricted mainly by the memory capacity to keep the components of the trial ground state. Carried out on a single PC, the method turns out to find exact solutions in a relatively short time with 10^8~10^9 basis states.
Keyword
Improved implementation method for exact diagonalization; Hubbard model Hamiltonian; t- J model Hamiltonian; Boolean operation; Reduction of the state space; Symmetry properties; Effective variation on the trial ground state
Journal Title
Computer physics communications
Citation Volume
180
ISSN
0010-4655
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Appears in Collections:
7. KISTI 연구성과 > 학술지 발표논문
URI
https://repository.kisti.re.kr/handle/10580/13812
http://www.ndsl.kr/ndsl/search/detail/article/articleSearchResultDetail.do?cn=NART48836825
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