UPPER BOUND FOR THE GRAND CANONICAL FREE ENERGY OF THE BOSE GAS IN THE GROSS-PITAEVSKII LIMIT

被引：3

作者：

Boccato, Chiara ^{[1
]}

Deuchert, Andreas ^{[2
]}

Stocker, David ^{[2
]}

机构：

[1] Univ Milan, Dept Math, I-20133 Milan, Italy

[2] Univ Zurich, Inst Math, CH-8057 Zurich, Switzerland

来源：

SIAM JOURNAL ON MATHEMATICAL ANALYSIS | 2024年 / 56卷 / 02期

基金：

瑞士国家科学基金会;

关键词：

quantum mechanics; quantum statistical mechanics; calculus of variations; mathematical physics; GROUND-STATE ENERGY; EINSTEIN CONDENSATION; HARD SPHERES; DILUTE; BOSONS; SYSTEM;

D O I：

10.1137/23M1580930

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

We consider a homogeneous Bose gas in the Gross-Pitaevskii limit at temperatures that are comparable to the critical temperature for Bose-Einstein condensation in the ideal gas. Our main result is an upper bound for the grand canonical free energy in terms of two new contributions: (a) The free energy of the interacting condensate is given in terms of an effective theory describing its particle number fluctuations, and (b) the free energy of the thermally excited particles equals that of a temperature-dependent Bogoliubov Hamiltonian.

引用

页码：2611 / 2660

页数：50

共 33 条

[21] The free energy of the two-dimensional dilute Bose gas. II. Upper bound
Mayer, Simon
Seiringer, Robert
JOURNAL OF MATHEMATICAL PHYSICS, 2020, 61 (06)
[22] Stability analysis of Bose gas: effect of external trapping and three-body interaction with Gross-Pitaevskii equation in Tonks-Girardeau regimes
Sasireka, Rajmohan
Lekeufack, Olivier Tiokeng
Uthayakumar, Ambikapathy
Sabari, Subramaniyan
JOURNAL OF THE KOREAN PHYSICAL SOCIETY, 2025, : 945 - 956
[23] THE FREE ENERGY OF THE TWO-DIMENSIONAL DILUTE BOSE GAS. I. LOWER BOUND
Deuchert, Andreas
Mayer, Simon
Seiringer, Robert
FORUM OF MATHEMATICS SIGMA, 2020, 8
[24] Localized waves and mixed interaction solutions with dynamical analysis to the Gross-Pitaevskii equation in the Bose-Einstein condensate
Wang, Haotian
Zhou, Qin
Biswas, Anjan
Liu, Wenjun
NONLINEAR DYNAMICS, 2021, 106 (01) : 841 - 854
[25] Free Energies of Dilute Bose Gases: Upper Bound
Yin, Jun
JOURNAL OF STATISTICAL PHYSICS, 2010, 141 (04) : 683 - 726
[26] A mass- and energy-preserving numerical scheme for solving coupled Gross-Pitaevskii equations in high dimensions
Liu, Jianfeng
Tang, Qinglin
Wang, Tingchun
NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS, 2023, 39 (06) : 4248 - 4269
[27] Dark and bright solitons for a three-dimensional Gross-Pitaevskii equation with distributed time-dependent coefficients in the Bose-Einstein condensation
Liu, Lei
Tian, Bo
Zhen, Hui-Ling
Wu, Xiao-Yu
Shan, Wen-Rui
SUPERLATTICES AND MICROSTRUCTURES, 2017, 102 : 498 - 511
[28] Sound Propagation in Cigar-Shaped Bose Liquids in the Thomas-Fermi Approximation: A Comparative Study between Gross-Pitaevskii and Logarithmic Models
Zloshchastiev, Konstantin G. G.
FLUIDS, 2022, 7 (11)
[29] Rogue waves for a (2+1)-dimensional Gross-Pitaevskii equation with time-varying trapping potential in the Bose-Einstein condensate
Wu, Xiao-Yu
Tian, Bo
Qu, Qi-Xing
Yuan, Yu-Qiang
Du, Xia-Xia
COMPUTERS & MATHEMATICS WITH APPLICATIONS, 2020, 79 (04) : 1023 - 1030
[30] Quadrupole oscillations in Bose-Fermi mixtures of ultracold atomic gases made of Yb atoms in the time-dependent Gross-Pitaevskii and Vlasov equations
Maruyama, Tomoyuki
Yabu, Hiroyuki
PHYSICAL REVIEW A, 2009, 80 (04):

← 1 2 3 4 →