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The BCS gap equation for spin-polarized fermions

We study the BCS gap equation for a Fermi gas with unequal population of spin-up and spin-down states. For $\cosh(δ_μ/T) \leq 2$, with $T$ the temperature and $δ_μ$ the chemical potential difference, the question of existence of non-trivial solutions can be reduced to spectral properties of a linear operator, similar to the unpolarized case studied previously in \cite{FHNS,HHSS,HS}. For $\cosh(δ_μ/T) > 2$ the phase diagram is more complicated, however. We derive upper and lower bounds for the critical temperature, and study their behavior in the small coupling limit.

preprint2011arXivOpen access
Abraham FreijiChristian HainzlRobert Seiringer
cond-mat.supr-conmath-phmath.MPcond-mat.quant-gas
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Abraham FreijiChristian HainzlRobert Seiringer

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