D. J. Wallace scite author profile

Abstract. We introduce effective Hamiltonians for Goldstone modes of the Euclidean group, representing fluctuations in the surface of a critical droplet or in the interface between two phases. The Euclidean invariance is non-linearly realised on the Goldstone fields. The Hamiltonians are non-renormalisable in more than one dimension, showing that the disappearance of a phase transition in one dimension for systems with a discrete symmetry may be interpreted in terms of the infrared instabilities induced by these modes. The existence and form of these Hamiltonians indicates the universality of the essential singularity at a first-order phase transition in models with Euclidean invariance.

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Monte Carlo renormalization-group calculations of critical behavior in the simple-cubic Ising model

Pawley

et al. 1984

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Feynman-Graph Expansion for the Equation of State near the Critical Point

1973

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Critical Behavior of a Classical Heisenberg Ferromagnet with Many Degrees of Freedom

1973

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Critical behaviour of the continuous n-component Potts model

Zia

Wallace

1975

J. Phys. A: Math. Gen.

189

106

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D. J. Wallace

Goldstone modes in vacuum decay and first-order phase transitions

Monte Carlo renormalization-group calculations of critical behavior in the simple-cubic Ising model

Feynman-Graph Expansion for the Equation of State near the Critical Point

Critical Behavior of a Classical Heisenberg Ferromagnet with Many Degrees of Freedom

Critical behaviour of the continuous n-component Potts model

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