ITP OpenIR  > SCI期刊论文
Guaita, Tommaso; Hack, Lucas; Shi, Tao2,3; Hubig, Claudius; Demler, Eugene4; Cirac, J. Ignacio
Gaussian time-dependent variational principle for the Bose-Hubbard model
Source PublicationPHYSICAL REVIEW B
AbstractWe systematically extend Bogoliubov theory beyond the mean-field approximation of the Bose-Hubbard model in the superfluid phase. Our approach is based on the time-dependent variational principle applied to the family of all Gaussian states (i.e., Gaussian TDVP). First, we find the best ground-state approximation within our variational class using imaginary time evolution in 1D, 2D, and 3D. We benchmark our results by comparing to Bogoliubov theory and DMRG in 1D. Second, we compute the approximate one- and two-particle excitation spectrum as eigenvalues of the linearized projected equations of motion (linearized TDVP). We find the gapless Goldstone mode, a continuum of two-particle excitations and a doublon mode. We discuss the relation of the gap between Goldstone mode and two-particle continuum to the excitation energy of the Higgs mode. Third, we compute linear response functions for perturbations describing density variation and lattice modulation and discuss their relations to experiment. Our methods can be applied to any perturbations that are linear or quadratic in creation/annihilation operators. Finally, we provide a comprehensive overview how our results are related to well-known methods, such as traditional Bogoliubov theory and random phase approximation.
Cooperation Status国际
Subject AreaMaterials Science ; Physics
MOST Discipline CatalogueMaterials Science, Multidisciplinary ; Physics, Applied ; Physics, Condensed Matter
Indexed BySCIE
Citation statistics
Cited Times:4[WOS]   [WOS Record]     [Related Records in WOS]
Document Type期刊论文
Affiliation1.Max Planck Inst Quantum Opt, Hans Kopfennann Str 1, D-85748 Garching, Germany
2.Munich Ctr Quantum Sci & Technol, Schellingstr 4, D-80799 Munich, Germany
3.Chinese Acad Sci, Inst Theoret Phys, CAS Key Lab Theoret Phys, Beijing 100190, Peoples R China
4.Univ Chinese Acad Sci, CAS Ctr Excellence Topol Quantum Computat, Beijing 100049, Peoples R China
5.Harvard Univ, Lyman Lab, Dept Phys, 17 Oxford St, Cambridge, MA 02138 USA
Recommended Citation
GB/T 7714
Guaita, Tommaso,Hack, Lucas,Shi, Tao,et al. Gaussian time-dependent variational principle for the Bose-Hubbard model[J]. PHYSICAL REVIEW B,2019,100(9):94529.
APA Guaita, Tommaso,Hack, Lucas,Shi, Tao,Hubig, Claudius,Demler, Eugene,&Cirac, J. Ignacio.(2019).Gaussian time-dependent variational principle for the Bose-Hubbard model.PHYSICAL REVIEW B,100(9),94529.
MLA Guaita, Tommaso,et al."Gaussian time-dependent variational principle for the Bose-Hubbard model".PHYSICAL REVIEW B 100.9(2019):94529.
Files in This Item:
There are no files associated with this item.
Related Services
Recommend this item
Usage statistics
Export to Endnote
Google Scholar
Similar articles in Google Scholar
[Guaita, Tommaso]'s Articles
[Hack, Lucas]'s Articles
[Shi, Tao]'s Articles
Baidu academic
Similar articles in Baidu academic
[Guaita, Tommaso]'s Articles
[Hack, Lucas]'s Articles
[Shi, Tao]'s Articles
Bing Scholar
Similar articles in Bing Scholar
[Guaita, Tommaso]'s Articles
[Hack, Lucas]'s Articles
[Shi, Tao]'s Articles
Terms of Use
No data!
Social Bookmark/Share
All comments (0)
No comment.

Items in the repository are protected by copyright, with all rights reserved, unless otherwise indicated.