Non-Fermi Liquid Behavior in a Disordered Kondo Alloy Model

Abstract

We study a mean-field model of a Kondo alloy using numerical techniques and analytic approximations. In this model, randomly distributed magnetic impurities interact with a band of conduction electrons and have a residual RKKY coupling of strength J. This system has a quantum critical point at J=Jc TK0, the Kondo scale of the problem. The T dependence of the spin susceptibility near the quantum critical point is singular with (0)-(T) Tγ and non-integer γ. At Jc, γ = 3/4. For J Jc there are two crossovers with decreasing T, first to γ=3/2 and then to γ=2, the Fermi-liquid value. The dissipative part of the time-dependent susceptibility ''(ω) ω as ω 0 except at the quantum critical point where we find ''(ω) ω. The characteristic spin-fluctuation energy vanishes at the quantum critical point with ω sf (1-J/Jc) for J Jc, and ω sf T3/2 at the critical coupling.

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