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Abstract
We provide a new formulation of methods in the theory of scaling expansion with the purpose of making our idea easier and more general for applications.
The dynamics of patterns governed by such macroscopic laws as rate equations in the case of chemical reactions, and the behaviour of large fluctuations from deterministic equations describing systems far from equilibrium, are discussed. Non-equilibrium properties of phase transitions in chemical systems are also studied.
The method presented here can be applied to the discussion of the dynamics of ferroelectric or ferromagnetic phase transitions described by Ising models.