Long distance entanglement in one-dimensional quantum systems under sinusoidal deformation

Abstract

We investigate entanglement generation in one-dimensional quantum spin systems with the sinusoidal deformation. In the system, the energy scale of each local term in the Hamiltonian is modified according to a position-dependent function α[πN (x - 12)], where x is the position of the local term and N is the length of the system. We show that at zero temperature the system with α 2 is able to generate a sizable entanglement between two spins at open edges even when the two spins are infinitely far apart. This long-distance entanglement is rather robust against thermal fluctuations and survives up to a temperature that decays with the system size slowly, in an algebraic form.