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Boundary conditions for quasiclassical Green's Function for superfluid Fermi systems

โœ Scribed by K. Nagai; J. Hara

Publisher
Springer US
Year
1988
Tongue
English
Weight
608 KB
Volume
71
Category
Article
ISSN
0022-2291

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โœฆ Synopsis

We show that the quasiclassical Green's Function for Fermi liquids can be constructed from the solutions of the Bogoliubov-de Gennes equation within the Andreev approximation and derive self-consistent relations to be satisfied by the quasiclassical Green's function at the surfaces. The so-called normalization condition for the quasiclassical Green's function is obtained from this self-consistent relation. We consider a specularly reflecting wall, a randomly rippled wall, and a proximil y boundary as model surfaces. Our boundary condition for the randomly rippled wall is different from that derived by Buchholtz and Rainer and Buchholtz.

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