Slow quenches in a quantum Ising chain: Dynamical phase transitions and topology

We study the slow quenching dynamics (characterized by an inverse rate tau(-1)) of a one-dimensional transverse Ising chain with nearest neighbor ferromagentic interactions across the quantum critical point (QCP) and analyze the Loschmidt overlap measured using the subsequent temporal evolution of the final wave function (reached at the end of the quenching) with the final time-independent Hamiltonian. Studying the Fisher zeros of the corresponding generalized "partition function," we probe nonanalyticities manifested in the rate function of the return probability known as dynamical phase transitions (DPTs). In contrast to the sudden quenching case, we show that DPTs survive in the subsequent temporal evolution following the quenching across two critical points of the model for a sufficiently slow rate; furthermore, an interesting "lobe" structure of Fisher zeros emerge. We have also made a connection to topological aspects studying the dynamical topological order parameter [nu(D)(t)] as a function of time (t) measured from the instant when the quenching is complete. Remarkably, the time evolution of nu(D)(t) exhibits drastically different behavior following quenches across a single QCP and two QCPs. In the former case, nu(D)(t) increases stepwise by unity at every DPT (i.e., Delta nu(D) = 1). In the latter case, on the other hand, nu(D)(t) essentially oscillates between 0 and 1 (i.e., successive DPTs occur with Delta nu(D) = 1 and Delta nu(D) = -1, respectively), except for instants where it shows a sudden jump by a factor of unity when two successive DPTs carry a topological charge of the same sign.