Journal article
Generalized classical theory of magnetism
C Pisani, CJ Thompson
Journal of Statistical Physics | Published : 1987
DOI: 10.1007/BF01011152
Abstract
We consider an Ising model with Kac potential γdK(γ|x|) which may have arbitrary sign, and show, following Gates and Penrose, that the free energy in the classical limit γ→0+ can be obtained from a variational principle. When the Fourier transform of the potential has its maximum at p=0 one recovers the usual mean-field theory of magnetism. When the maximum occurs for p0≠0, however, one obtains an oscillatory or helicoidal phase in which the magnetization near the critical point oscillates with period 2 π/|p0|. An example with a potential possessing parameter-dependent oscillations is shown to exhibit crossover phenomena and a multicritical Lifshitz point in the classical limit. © 1987 Plenu..
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