quasienergies

Quasienergies arise in quantum systems with a time-periodic Hamiltonian H(t) = H(t + T), where T is the driving period. According to Floquet theory, solutions to the Schrödinger equation can be written as psi_alpha(t) = exp(-i epsilon_alpha t / hbar) phi_alpha(t), where phi_alpha(t) is periodic with period T and epsilon_alpha are the quasienergies. The quasienergies are defined modulo hbar omega, with omega = 2 pi / T, so adding multiples of hbar omega yields physically equivalent states.

Quasienergies are not simply eigenvalues of H(t) at any moment. They are the eigenvalues of the one-period

Interpretation and implications: the phase accumulated per period is governed by epsilon_alpha, and energy is not

Applications and methods: quasienergies underpin Floquet engineering, where high-frequency driving creates effective static Hamiltonians with tailored