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Problem 1: Phonons in solids

Problem 2: Cosmic microwave background radition

Problem 3: Bose-Einstein condensation of diluted gases in harmonic traps

The Nobel Prize in Physics 2001 has been awarded for "the achievement of Bose-Einstein condensation in dilute gases of alkali atoms, and for early fundamental studies of the properties of the condensates". Such experimental realizations of BEC rely on trapping cold atoms in a potential. Close to its minimum, the potential can be expanded to second order, and has the form

${\displaystyle U(\mathbf {r} )={\frac {m}{2}}\sum _{\alpha }\omega _{\alpha }^{2}x_{\alpha }^{2}}$

where we allow for the possiblity of anisotropic confinment, with different frequenies along different directions.

(a) We are interested in the limit of wide traps such that ${\displaystyle \hbar \omega \ll k_{B}T}$, the the discretness of the allowed energies can be largely ignored. Show that in the limit, the number of states ${\displaystyle N(E)}$ and the corresponding density of states ${\displaystyle g(E)}$ are given by