Ground-state properties of hard-core bosons in one-dimensional harmonic traps
- 10 April 2003
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review A
- Vol. 67 (4) , 041601
- https://doi.org/10.1103/physreva.67.041601
Abstract
The one-particle density matrices for hard-core bosons in a one-dimensional harmonic trap are computed numerically for systems with up to 160 bosons. Diagonalization of the density matrix shows that the many-body ground state is not Bose-Einstein condensed. The ground-state occupation, the amplitude of the lowest natural orbital, and the zero momentum peak height scale as powers of the particle number, and the corresponding exponents are related to each other. Close to its diagonal, the density matrix for hard-core bosons is similar to that of noninteracting fermions.Keywords
All Related Versions
This publication has 17 references indexed in Scilit:
- Universal solutions for interacting bosons in one-dimensional harmonic trapsPhysical Review A, 2002
- Exploring Phase Coherence in a 2D Lattice of Bose-Einstein CondensatesPhysical Review Letters, 2001
- Realization of Bose-Einstein Condensates in Lower DimensionsPhysical Review Letters, 2001
- Quasipure Bose-Einstein Condensate Immersed in a Fermi SeaPhysical Review Letters, 2001
- Bosons in Cigar-Shaped Traps: Thomas-Fermi Regime, Tonks-Girardeau Regime, and In BetweenPhysical Review Letters, 2001
- Ground-state properties of a one-dimensional system of hard-core bosons in a harmonic trapPhysical Review A, 2001
- Regimes of Quantum Degeneracy in Trapped 1D GasesPhysical Review Letters, 2000
- Atomic Scattering in the Presence of an External Confinement and a Gas of Impenetrable BosonsPhysical Review Letters, 1998
- Bose-Einstein condensation of a finite number of particles trapped in one or three dimensionsPhysical Review A, 1996
- Permutation Symmetry of Many-Particle Wave FunctionsPhysical Review B, 1965