A renormalization group study of a class of reaction-diffusion model, with particles input

Abstract

We study a class of reaction-diffusion model extrapolating continuously between the pure coagulation-diffusion case (A+A A) and the pure annihilation-diffusion one (A+A) with particles input ( A) at a rate J. For dimension d≤ 2, the dynamics strongly depends on the fluctuations while, for d >2, the behaviour is mean-field like. The models are mapped onto a field theory which properties are studied in a renormalization group approach. Simple relations are found between the time-dependent correlation functions of the different models of the class. For the pure coagulation-diffusion model the time-dependent density is found to be of the form c(t,J,D) = (J/D)1/δ F[(J/D) Dt], where D is the diffusion constant. The critical exponent δ and are computed to all orders in ε=2-d, where d is the dimension of the system, while the scaling function F is computed to second order in ε. For the one-dimensional case an exact analytical solution is provided which predictions are compared with the results of the renormalization group approach for ε=1.

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