Related papers: Relevance of Anisotropy in the Kondo Effect -- Lessons From the Symplectic Case

Relevance of Anisotropy in the Kondo Effect -- Lessons From the Symplectic Case

URL: http://arxiv.org/abs/2407.12093v2
Date: Tue, 6 Aug 2024 08:35:49 GMT
Title: Relevance of Anisotropy in the Kondo Effect -- Lessons From the Symplectic Case
Authors: Matan Lotem, Sarath Sankar, Tianhao Ren, Moshe Goldstein, Elio. J. König, Andreas Weichselbaum, Eran Sela, Alexei M. Tsvelik,
Abstract summary: A Kondo model with symplectic symmetry was recently put forward as the effective low-energy theory of a superconducting-island device coupled to multiple leads. We show that asymmetry in the coupling to the leads destabilizes the non-Fermi liquid. Results highlight a common misconception that anisotropy in the Kondo coupling is always irrelevant.
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License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: A Kondo model with symplectic symmetry was recently put forward as the effective low-energy theory of a superconducting-island device coupled to multiple leads. This model, which possesses non-Fermi liquid physics and effective anyons, was argued to belong to the class of topological Kondo effects. Here, we clarify the extent of stability of its exotic fixed point using perturbative and numerical renormalization group in conjunction with bosonization and conformal field theory. In contrast to previous claims, we show that asymmetry in the coupling to the leads destabilizes the non-Fermi liquid. Other destabilizing perturbations include asymmetry in the superconducting pairing or internal energy of the individual quantum dots in the island. Nevertheless, these perturbations all generate the same relevant operators. Thus, only a small number of couplings need to be tuned individually, and these can be selected according to experimental convenience. Our results highlight a common misconception that anisotropy in the Kondo coupling is always irrelevant. As demonstrated, relevant terms will emerge whenever the group generators do not span the full space of impurity operators. This calls for a more detailed inspection of models that exhibit this property, such as large-spin impurities and SO(M) Kondo models

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