We study the phase diagram and quantum critical region of one of the fundamental models for electronic correlations: the periodic Anderson model. Employing the recently developed dynamical vertex approximation, we find a phase transition between a zero-temperature antiferromagnetic insulator and a Kondo insulator. In the quantum critical region, we determine a critical exponent gamma = 2 for the antiferromagnetic susceptibility. At higher temperatures, we have free spins with gamma =1 instead, whereas at lower temperatures, there is an even stronger increase and suppression of the susceptibility below and above the quantum critical point, respectively.
Quantum Criticality in the Two-Dimensional Periodic Anderson Model / Schaefer, T; Katanin, Aa; Kitatani, M; Toschi, A; Held, K. - In: PHYSICAL REVIEW LETTERS. - ISSN 0031-9007. - 122:22(2019). [10.1103/PhysRevLett.122.227201]
Quantum Criticality in the Two-Dimensional Periodic Anderson Model
Schaefer T;
2019-01-01
Abstract
We study the phase diagram and quantum critical region of one of the fundamental models for electronic correlations: the periodic Anderson model. Employing the recently developed dynamical vertex approximation, we find a phase transition between a zero-temperature antiferromagnetic insulator and a Kondo insulator. In the quantum critical region, we determine a critical exponent gamma = 2 for the antiferromagnetic susceptibility. At higher temperatures, we have free spins with gamma =1 instead, whereas at lower temperatures, there is an even stronger increase and suppression of the susceptibility below and above the quantum critical point, respectively.Pubblicazioni consigliate
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