Abstract

The mathematical description of B.E. (Bose-Einstein) condensation is generalized so as to be applicable to a system of interacting particles. B.E. condensation is said to be present whenever the largest eigenvalue of the one-particle reduced density matrix is an extensive rather than an intensive quantity. Some transformations facilitating the practical use of this definition are given. An argument based on first principles is given, indicating that liquid helium II in equilibrium shows B.E. condensation. For absolute zero, the argument is based on properties of the ground-state wave lunction derived from the assumption that there is no "long-range configurational order." A crude estimate indicates that roughly 8% of the atoms are "condensed" (note that the fraction of condensed particles need not be identified with ρs /ρ). Conversely, it is shown why one would not expect B.E. condensation in a solid. For finite temperatures Feynman's theory of the lambda-transition is applied: Feynman's approximations are shown to imply that our criterion of B.E. condensation is satisfied below the lambda-transition but not above it.

Keywords

Liquid heliumCondensationBose–Einstein condensateHeliumEinsteinPhysicsMaterials scienceAtomic physicsThermodynamicsCondensed matter physicsQuantum mechanics

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Publication Info

Year
2018
Type
book-chapter
Pages
412-420
Citations
744
Access
Closed

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Cite This

O. Penrose, Lars Onsager (2018). Bose-Einstein Condensation and Liquid Helium. , 412-420. https://doi.org/10.4324/9780429494116-14

Identifiers

DOI
10.4324/9780429494116-14