Converting PT-Symmetric Topological Classes by Floquet Engineering
Abstract
Going beyond the conventional classification rule of Altland-Zirnbauer symmetry classes, PT symmetric topological phases are classified by (PT)2=1 or -1. The interconversion between the two PT-symmetric topological classes is generally difficult due to the constraint of (PT)2. Here, we propose a scheme to control and interconvert the PT-symmetric topological classes by Floquet engineering. We find that it is the breakdown of the Z2 gauge, induced by the π phase difference between different hopping rates, by the periodic driving that leads to such an interconversion. Relaxing the system from the constraint of (PT)2, rich exotic topological phases, e.g., the coexisting PT-symmetric first-order real Chern insulator and second-order topological insulators not only in different quasienergy gaps, but also in one single gap, are generated. In contrast to conventional Floquet topological phases, our result provides a way to realize exotic topological phases without changing symmetries. It enriches the family of topological phases and gives an insightful guidance for the development of multifunctional quantum devices.
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