Subspace-thermal discrete time crystals from phase transitions between different n-tuple discrete time crystals

• Published in: arXiv.org
• Main Authors: Yu, Hongye, Wei, Tzu-Chieh
• Format: Paper
• Language: English
• Published: Ithaca Cornell University Library, arXiv.org 04.09.2024
• Subjects: Crystals; Discrete time systems; Energy gap; Many body problem; Perturbation theory; Phase transitions; Subspaces
• ISSN: 2331-8422

We propose a new Floquet time crystal model that responds in arbitrary multiples of the driving period. Such an n-tuple discrete time crystal is theoretically constructed by permuting spins in a disordered chain and is well suited for experiment implementations. Transitions between these time crystals with different periods give rise to a novel phase of matter that we call subspace-thermal discrete time crystals, where states within subspaces are fully thermalized at an early time. However, the whole system still robustly responds to the periodic driving subharmonically, with a period being the greatest common divisor of the original two periods. Existing theoretical analysis from many-body localization fails to understand the rigidity of such subspace-thermal time crystal phases. To resolve this, we develop a new theoretical framework from the perspective of the robust \(2\pi/n\) quasi-energy gap. Its robustness is analytically proved, under a reasonable conjecture, by a new perturbation theory for unitary operators. The proof applies beyond the models considered here to other existing discrete time crystals realized by kicking disordered systems, thus offering a systematic way to construct new discrete time crystal models. We also introduce the notion of DTC-charges that allow us to probe the observables that spontaneously break the time-translation symmetry in both the regular discrete time crystals and subspace-thermal discrete time crystals. Moreover, our discrete time crystal models can be generalized to higher spin magnitudes or qudits, as well as higher spatial dimensions.