English

Harmonically Trapped Quantum Gases

Statistical Mechanics 2016-08-16 v1 Soft Condensed Matter

Abstract

We solve the problem of a Bose or Fermi gas in dd-dimensions trapped by % \delta \leq d mutually perpendicular harmonic oscillator potentials. From the grand potential we derive their thermodynamic functions (internal energy, specific heat, etc.) as well as a generalized density of states. The Bose gas exhibits Bose-Einstein condensation at a nonzero critical temperature TcT_{c} if and only if d+δ>2d+\delta >2, and a jump in the specific heat at TcT_{c} if and only if d+δ>4d+\delta >4. Specific heats for both gas types precisely coincide as functions of temperature when d+δ=2d+\delta =2. The trapped system behaves like an ideal free quantum gas in d+δd+\delta dimensions. For δ=0\delta =0 we recover all known thermodynamic properties of ideal quantum gases in dd dimensions, while in 3D for δ=\delta = 1, 2 and 3 one simulates behavior reminiscent of quantum {\it wells, wires}and{\it dots}, respectively.

Keywords

Cite

@article{arxiv.cond-mat/0205468,
  title  = {Harmonically Trapped Quantum Gases},
  author = {M. Grether and M. Fortes and M. de Llano and J. L. del Río and F. J. Sevilla and M. A. Solís and Ariel A. Valladares},
  journal= {arXiv preprint arXiv:cond-mat/0205468},
  year   = {2016}
}

Comments

14 pages including 3 figures and 3 tables