Topological quantum quench dynamics carrying arbitrary Hopf and second-Chern numbers

Abstract

A quantum quench is a nonequilibrium dynamics governed by the unitary evolution. We propose a two-band model whose quench dynamics is characterized by an arbitrary Hopf number belonging to the homotopy group π 3(S2)=Z. When we quench a system from an insulator with the Chern number Ci∈ π 2(S2)=Z to another insulator with the Chern number Cf , the preimage of the Hamiltonian vector forms links having the Hopf number Cf-Ci. We also investigate a quantum-quench dynamics for a four-band model carrying an arbitrary second-Chern number N∈ π 4(S4)=Z, which can be realized by quenching a three-dimensional topological insulator having the three-dimensional winding number N∈ π 3(S3)=Z.