We study tunneling and mixing time for a non-reversible probabilistic cellular automaton. With a suitable choice of the parameters, we first show that the stationary distribution is close in total variation to a low temperature Ising model. Then we prove that both the mixing time and the time to exit a metastable state grow polynomially in the size of the system, while this growth is exponential in reversible dynamics. In this model, non-reversibility, parallel updatings and a suitable choice of boundary conditions combine to produce an efficient dynamical stability.
Dai Pra, P., Scoppola, B., Scoppola, E. (2015). Fast Mixing for the Low Temperature 2D Ising Model Through Irreversible Parallel Dynamics. JOURNAL OF STATISTICAL PHYSICS, 159(1), 1-20 [10.1007/s10955-014-1180-y].
Fast Mixing for the Low Temperature 2D Ising Model Through Irreversible Parallel Dynamics
Scoppola B.;
2015-01-01
Abstract
We study tunneling and mixing time for a non-reversible probabilistic cellular automaton. With a suitable choice of the parameters, we first show that the stationary distribution is close in total variation to a low temperature Ising model. Then we prove that both the mixing time and the time to exit a metastable state grow polynomially in the size of the system, while this growth is exponential in reversible dynamics. In this model, non-reversibility, parallel updatings and a suitable choice of boundary conditions combine to produce an efficient dynamical stability.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
