Quantum conductance problems and the Jacobi ensemble

Details Quantum conductance problems and the Jacobi ensemble Quantum conductance problems and the Jacobi ensemble

2006-01-12

arxiv.org/abs/math-ph/0601024v1

Physics

Mathematical Physics

10 pages

Scientific paper

10.1088/0305-4470/39/22/004

In one dimensional transport problems the scattering matrix $S$ is decomposed into a block structure corresponding to reflection and transmission matrices at the two ends. For $S$ a random unitary matrix, the singular value probability distribution function of these blocks is calculated. The same is done when $S$ is constrained to be symmetric, or to be self dual quaternion real, or when $S$ has real elements, or has real quaternion elements. Three methods are used: metric forms; a variant of the Ingham-Seigel matrix integral; and a theorem specifying the Jacobi random matrix ensemble in terms of Wishart distributed matrices.

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