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Boundary time crystals in collective<mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML"><mml:mi>d</mml:mi></mml:math>-level systems

Luis Fernando dos Prazeres, Leonardo da Silva Souza, Fernando Iemini

2021Physical review. B./Physical review. B52 citationsDOIOpen Access PDF

Abstract

Boundary time crystals (BTC's) are nonequilibrium phases of matter occurring in quantum systems in contact to an environment, for which a macroscopic fraction of the many-body system breaks time translation symmetry. We study BTC's in collective $d$-level systems, focusing on the cases with $d=2$, 3, and 4. We find that BTC's appear in different forms for the different cases. We first consider the model with collective $d=2$-level systems [Phys. Rev. Lett. 121, 035301 (2018)], whose dynamics is described by a Gorini-Kossakowski-Sudarshan-Lindblad master equation, and perform a throughout analysis of its phase diagram and Jacobian stability for different interacting terms in the coherent Hamiltonian. In particular, using perturbation theory for general (non-Hermitian) matrices, we obtain analytically how a specific ${\mathbb{Z}}_{2}$ symmetry-breaking Hamiltonian term destroys the BTC phase in the model. Based on these results we define a $d=4$ model composed of a pair of collective two-level systems interacting with each other. We show that this model support richer dynamical phases, ranging from limit cycles, period-doubling bifurcations, and a route to chaotic dynamics. The BTC phase is more robust in this case, not annihilated by the former symmetry-breaking Hamiltonian terms. The model with collective $d=3$-level systems is defined similarly, as competing pairs of levels, but sharing a common collective level. The dynamics can deviate significantly from the previous cases, supporting phases with the coexistence of multiple limit cycles, closed orbits and a full degeneracy of zero Lyapunov exponents.

Topics & Concepts

Hamiltonian (control theory)PhysicsMathematical physicsMathematicsMathematical optimizationQuantum many-body systemsCold Atom Physics and Bose-Einstein CondensatesQuantum, superfluid, helium dynamics
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