Self-similar analytical solution of the critical fluctuations problem for the Bose–Einstein condensation in an ideal gas

An exact analytical solution for the universal probability distribution of the order parameter fluctuations as well as for the universal statistical and thermodynamic functions of an ideal gas in the whole critical region of Bose--Einstein condensation (BEC) is obtained. A universal constraint nonli...

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Bibliographic Details
Published in:Journal of physics. A, Mathematical and theoretical Mathematical and theoretical, 2010-06, Vol.43 (22), p.225001-225001
Main Authors: Kocharovsky, Vitaly V, Kocharovsky, Vladimir V
Format: Article
Language:English
Subjects:
Asymptotic properties
Condensing
Cylinders
Fluctuation
Ideal gas
Mathematical analysis
Order parameters
Thermodynamics
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Summary:An exact analytical solution for the universal probability distribution of the order parameter fluctuations as well as for the universal statistical and thermodynamic functions of an ideal gas in the whole critical region of Bose--Einstein condensation (BEC) is obtained. A universal constraint nonlinearity is found that is responsible for all nontrivial critical phenomena of the BEC phase transition. Simple analytical approximations, which describe the universal structure of the critical region in terms of confluent hypergeometric or parabolic cylinder functions, as well as asymptotics of the exact solution are derived. The results for the order parameter, all higher order moments of BEC fluctuations and thermodynamic quantities, including specific heat, perfectly match the known asymptotics outside critical region as well as the phenomenological renormalization-group ansatz with known critical exponents in the close vicinity of the critical point. Thus, a full analytical solution to a long-standing problem of finding a universal structure of the Delta *l point for BEC in an ideal gas is found.
ISSN:1751-8121
1751-8113
1751-8121
DOI:10.1088/1751-8113/43/22/225001