Long-time traces of the initial condition in relaxation phenomena near criticality

Abstract

The time evolution of systems relaxing towards thermal equilibrium is examined near the critical temperature Tc, with special attention paid to the role of the initial value mi of the order parameter φ. To this end, the n-component model A for a cube of length L is investigated. The common belief that all memory of mi is necessarily lost after a microscopic time span is shown to be unfounded. General arguments and the exact solution of the limit n∞ show that mi leaves its traces in both the linear and nonlinear long-time relaxation of φ near or at Tc. Specifically for linear relaxation near Tc, or at Tc with L<∞, the amplitude of the exponential decay depends on mi and the short-time exponent θ'=(xi-xφ)/z, provided ti mi-z/xi is comparable to or larger than other time scales. Here xi is the scaling dimension of mi, z is the dynamic bulk exponent, and xφ is the usual equilibrium scaling dimension of φ .

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