
arXiv: 1803.10331
In presence of interactions, a closed, homogeneous (disorder-free) many-body system is believed to generically heat up to an `infinite temperature' ensemble when subjected to a periodic drive: in the spirit of the ergodicity hypothesis underpinning statistical mechanics, this happens as no energy or other conservation law prevents this. Here we present an interacting Ising chain driven by a field of time-dependent strength, where such heating onsets only below a threshold value of the drive amplitude, above which the system exhibits non-ergodic behaviour. The onset appears at {\it strong, but not fast} driving. This in particular puts it beyond the scope of high-frequency expansions. The onset location shifts, but it is robustly present, across wide variations of the model Hamiltonian such as driving frequency and protocol, as well as the initial state. The portion of nonergodic states in the Floquet spectrum, while thermodynamically subdominant, has a finite entropy. We find that the magnetisation as an {\it emergent} conserved quantity underpinning the freezing; indeed the freezing effect is readily observed, as initially magnetised states remain partially frozen {\it up to infinite time}. This result, which bears a family resemblance to the Kolmogorov-Arnold-Moser theorem for classical dynamical systems, could be a valuable ingredient for extending Floquet engineering to the interacting realm.
10 pages, including Supplemental Material
Statistical Mechanics (cond-mat.stat-mech), Floquet System, FOS: Physical sciences, Floquet Thermalization, Thermalization Threshold, Time dependent processes, Floquet Suppression of Heating, [PHYS] Physics [physics], Dynamical Freezing, Thermalization Transition, Floquet KAM, Condensed Matter - Statistical Mechanics
Statistical Mechanics (cond-mat.stat-mech), Floquet System, FOS: Physical sciences, Floquet Thermalization, Thermalization Threshold, Time dependent processes, Floquet Suppression of Heating, [PHYS] Physics [physics], Dynamical Freezing, Thermalization Transition, Floquet KAM, Condensed Matter - Statistical Mechanics
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