Size Dependence In The Disordered Kondo Problem

Ivar Martin; Yi Wan; and Philip Phillips

arXiv:cond-mat/9607074·cond-mat·October 28, 2009

Size Dependence In The Disordered Kondo Problem

Ivar Martin, Yi Wan, and Philip Phillips

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Abstract

We study here the role randomly-placed non-magnetic scatterers play on the Kondo effect. We show that spin relaxation effects (with time $τ_{s}^{o}$ )in the vertex corrections to the Kondo self-energy lead to an exact cancellation of the singular temperature dependence arising from the diffusion poles. For a thin film of thickness $L$ and a mean-free path $ℓ$ , disorder provides a correction to the Kondo resistivity of the form $τ_{s}^{o} / (k_{F} L ℓ^{2}) ln T$ that explains both the disorder and sample-size depression of the Kondo effect observed by Blachly and Giordano (PRB {\bf 51}, 12537 (1995)).

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TopicsAlgebraic Geometry and Number Theory