Large-N Scaling Behavior of the Lipkin-Meshkov-Glick Model
Overview
Affiliations
We introduce a novel semiclassical approach to the Lipkin model. In this way the well-known phase transition arising at the critical value of the coupling is intuitively understood. New results--showing for strong couplings the existence of a threshold energy which separates deformed from undeformed states as well as the divergence of the density of states at the threshold energy--are explained straightforwardly and in quantitative terms by the appearance of a double well structure in a classical system corresponding to the Lipkin model. Previously unnoticed features of the eigenstates near the threshold energy are also predicted and found to hold.
Quantum Information Scrambling in Adiabatically Driven Critical Systems.
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Phase and Amplitude Modes in the Anisotropic Dicke Model with Matter Interactions.
Herrera Romero R, Bastarrachea-Magnani M Entropy (Basel). 2024; 26(7).
PMID: 39056936 PMC: 11276390. DOI: 10.3390/e26070574.
Spectral kissing and its dynamical consequences in the squeeze-driven Kerr oscillator.
Chavez-Carlos J, Lezama T, Cortinas R, Venkatraman J, Devoret M, Batista V npj Quantum Inf. 2024; 9(1):76.
PMID: 38665256 PMC: 11041765. DOI: 10.1038/s41534-023-00745-1.
Critical Phenomena in Light-Matter Systems with Collective Matter Interactions.
Herrera Romero R, Bastarrachea-Magnani M, Linares R Entropy (Basel). 2022; 24(9).
PMID: 36141084 PMC: 9497676. DOI: 10.3390/e24091198.
Opatrny T, Richterek L, Opatrny M Sci Rep. 2018; 8(1):1984.
PMID: 29386576 PMC: 5792583. DOI: 10.1038/s41598-018-20486-y.