ISSN:
1572-9613
Keywords:
Ising lattice
;
spin correlations
;
spin distribution function
;
dynamics of correlations
;
master equation
Source:
Springer Online Journal Archives 1860-2000
Topics:
Physics
Notes:
Abstract We have studied the relaxation of then-spin correlation function 〈σ (n)〉 and distribution functionP n(σ (n);t) for the Glauber model of the one-dimensional Ising lattice. We find that new combinations of correlation functions (C-functions) and distribution functions (Q-functions) are more useful in discussing the relaxation of this system from initial nonequilibrium states than the usual cumulants and Ursell functions used in our papers I and II. The asymptotic behavior of theP, C, andQ functions are:P n(σ (n);t) —P n (o) ∼P 1(σ;t) —P 1 (o) (σ);C n(σ (n); t) —C n (o) (σ (n)) ∼ 〈σ〉;Q n(σ (n)); —Q n (o) (σ (n)) ∼ [P 1(σ;t) —P 1 (o) (σ)]n; where the superscript zero denotes the equilibrium function. These results imply thatP n(σ (n);),n〉 2, decays to a functional of lower-order distribution functions as [P 1(σ;) —P 1 (o) (σ)]n and that then-spin correlation function 〈o(n)〉 withn 〉 2 decays to a functional of lower-order correlation functions as 〈σ〉n. This result for the distribution functionP n(σ (n);),n〉 2, is identical with the results obtained in papers I and II for initially correlated, noninteracting many-particle systems in contact with a heat bath and for an infinite chain of coupled harmonic oscillators. As a special example, we study the relaxation of the spin system when the heat-bath temperature is changed suddenly from an initial temperatureT o to a final temperatureT. We obtain the interesting result that the spin system is not canonically invariant, i.e., it cannot be characterized by a time-dependent “spin temperature.”
Type of Medium:
Electronic Resource
URL:
http://dx.doi.org/10.1007/BF01009708
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