Competing Glauber and Kawasaki Dynamics

• Published in: International journal of modern physics. B, Condensed matter physics, statistical physics, applied physics Vol. 12; no. 23; pp. 2385 - 2392
• Main Authors: Artz, Simone, Trimper, Steffen
• Format: Journal Article
• Language: English
• Published: World Scientific Publishing Company 20.09.1998
• ISSN: 0217-9792; 1793-6578
• DOI: 10.1142/S0217979298001393

Using a quantum formulation of the master equation we study a kinetic Ising model with competing stochastic processes: the Glauber dynamics with probability p and the Kawasaki dynamics with probability 1-p. Introducing explicitly the coupling to a heat bath and the mutual static interaction of the spins the model can be traced back exactly to a Ginzburg–Landau functional when the interaction is of long range order. The dependence of the correlation length on the temperature and on the probability p is calculated. In case that the spins are subject to flip processes the correlation length disappears for each finite temperature. In the exchange dominated case the system is strongly correlated for each temperature.