Relaxation modes in random spin systems

A method of finding slow relaxation modes in random spin systems is proposed. For stochastic dynamics, an approximate relaxation mode { f i } and its relaxation rate λ are determined from an eigenvalue problem ∑ j C i , j ( t 0 + t ) f j =exp (-λ t ) ∑ j C i , j ( t 0 ) f j , where C i , j ( t )= is the correlation matrix of spins. The method is applied to the two-dimensional ± J Ising spin glass below the critical temperature of the corresponding nonrandom ferromagnet. It is found through Monte Carlo simulations that the slow relaxation modes obtained by the present method describe the long-time behavior of spins well. The slow relaxation modes are spatially localized and can be regarded as clusters. The distribution of the relaxation rates is consistent with the prediction of the theory which assumes independent motion of clusters.

[1]  Matthias Brack,et al.  Self-consistent average density matrices and the strutinsky energy theorem , 1975 .

[2]  S. Miyashita,et al.  Relaxation of the Spin Autocorrelation Function in the Ising Spin Glass , 1995 .

[3]  Robert B. Griffiths,et al.  Nonanalytic Behavior Above the Critical Point in a Random Ising Ferromagnet , 1969 .

[4]  James P. Sethna,et al.  Griffiths Singularities in the Dynamics of Disordered Ising Models , 1988 .

[5]  K. Hukushima,et al.  A Monte Carlo study on the spin dynamics of the 2D+or-J Ising spin glass model , 1993 .

[6]  R. Glauber Time‐Dependent Statistics of the Ising Model , 1963 .

[7]  Ryogo Kubo,et al.  Dynamics of the Ising Model near the Critical Point. I , 1968 .

[8]  Relaxation of the spin autocorrelation function in the kinetic ising model with bond dilution , 1989 .

[9]  Bray,et al.  Nature of the Griffiths phase. , 1987, Physical review letters.

[10]  S. Miyashita,et al.  Dynamical Nature of the Phase Transition of the Two-Dimensional Kinetic Ising Model , 1985 .

[11]  D. Dhar Stochastic evolution in ising models , 1983 .

[12]  Ogielski,et al.  Dynamics of three-dimensional Ising spin glasses in thermal equilibrium. , 1985, Physical review. B, Condensed matter.

[13]  Bray Dynamics of dilute magnets above Tc. , 1988, Physical review letters.

[14]  D. Mattis Solvable spin systems with random interactions , 1976 .

[15]  Miller,et al.  Thermodynamical properties of a class of models with non-Abelian internal symmetries at finite temperature and baryon number. , 1988, Physical review. D, Particles and fields.

[16]  Palmer,et al.  Low-frequency relaxation in Ising spin-glasses. , 1985, Physical review letters.

[17]  Nakanishi,et al.  Stretched exponential decay of the spin-correlation function in the kinetic Ising model below the critical temperature. , 1988, Physical review. B, Condensed matter.

[18]  H. Takano Finite-Size Scaling Approach to the Kinetic Ising Model , 1982 .