Signatures and conditions for phase band crossings in periodically driven integrable systems

Abstract

We present generic conditions for phase band crossings for a class of periodically driven integrable systems represented by free fermionic models subjected to arbitrary periodic drive protocols characterized by a frequency ωD. These models provide a representation for the Ising and XY models in d=1, the Kitaev model in d=2, several kinds of superconductors, and Dirac fermions in graphene and atop topological insulator surfaces. Our results demonstrate that the presence of a critical point/region in the system Hamiltonian (which is traversed at a finite rate during the dynamics) may change the conditions for phase band crossings that occur at the critical modes. We also show that for d>1, phase band crossings leave their imprint on the equal-time off-diagonal fermionic correlation functions of these models; the Fourier transforms of such correlation functions, F k0( ω0), have maxima and minima at specific frequencies which can be directly related to ωD and the time at which the phase bands cross at k = k0. We discuss the significance of our results in the contexts of generic Hamiltonians with N>2 phase bands and the underlying symmetry of the driven Hamiltonian.