Ludovic Berthier, Peter C. W. Holdsworth, Mauro Sellitto
Published 2000-12-12, updated 2001-02-20Version 2
The nonequilibrium critical dynamics of the 2D XY model is investigated numerically through Monte Carlo simulations and analytically in the spin-wave approximation. We focus in particular on the behaviour of the two-time response and correlation functions and show that the ageing dynamics depends on the initial conditions. The presence of critical fluctuations leads to non-trivial violations of the fluctuation-dissipation theorem apparently reminiscent of the three dimensional Edwards-Anderson spin glass model. We compute for this reason the finite-size overlap probability distribution function and find that it is related to the finite-time fluctuation-dissipation ratio obtained in the out of equilibrium dynamics, provided that the temperature is not very low.
Comments: Minor changes - Version accepted for publication - Journal of Physics A
Journal: J. Phys. A 34, 1805 (2001)
The 2D XY model on a finite lattice with structural disorder: quasi-long-range ordering under realistic conditions
Nonequilibrium critical dynamics of the bi-dimensional $\pm J$ Ising model
Vortex corrections to universal scaling of magnetic fluctuations in 2D XY model
