Critical behavior of anisotropic cubic systems

Amnon Aharony

doi:10.1103/PhysRevB.8.4270

Critical behavior of anisotropic cubic systems

Amnon Aharony

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223 Scopus citations

Abstract

The critical behavior in zero field above Tc of ferromagnets or ferroelectrics with a Hamiltonian of cubic symmetry is studied, to order ε2, by exact renormalization-group techniques in d=4-ε dimensions with n-component spins. For ε=1, nY3, a crossover from isotropic (Heisenberg) to characteristic cubic behavior occurs, with the new value 2vC=1+[(n-1)3n]ε+[(n-1)324n3](17n2+290n-424)ε2+O(ε3), and cubic symmetry appearing in the four-spin correlation function. Experiments on structural phase transitions are considered briefly.

Original language	English
Pages (from-to)	4270-4273
Number of pages	4
Journal	Physical Review B-Condensed Matter
Volume	8
Issue number	9
DOIs	https://doi.org/10.1103/PhysRevB.8.4270
State	Published - 1 Jan 1973
Externally published	Yes

ASJC Scopus subject areas

Condensed Matter Physics

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10.1103/PhysRevB.8.4270

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title = "Critical behavior of anisotropic cubic systems",

abstract = "The critical behavior in zero field above Tc of ferromagnets or ferroelectrics with a Hamiltonian of cubic symmetry is studied, to order ε2, by exact renormalization-group techniques in d=4-ε dimensions with n-component spins. For ε=1, nY3, a crossover from isotropic (Heisenberg) to characteristic cubic behavior occurs, with the new value 2vC=1+[(n-1)3n]ε+[(n-1)324n3](17n2+290n-424)ε2+O(ε3), and cubic symmetry appearing in the four-spin correlation function. Experiments on structural phase transitions are considered briefly.",

author = "Amnon Aharony",

year = "1973",

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doi = "10.1103/PhysRevB.8.4270",

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AB - The critical behavior in zero field above Tc of ferromagnets or ferroelectrics with a Hamiltonian of cubic symmetry is studied, to order ε2, by exact renormalization-group techniques in d=4-ε dimensions with n-component spins. For ε=1, nY3, a crossover from isotropic (Heisenberg) to characteristic cubic behavior occurs, with the new value 2vC=1+[(n-1)3n]ε+[(n-1)324n3](17n2+290n-424)ε2+O(ε3), and cubic symmetry appearing in the four-spin correlation function. Experiments on structural phase transitions are considered briefly.

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U2 - 10.1103/PhysRevB.8.4270

DO - 10.1103/PhysRevB.8.4270

M3 - Article

AN - SCOPUS:0001049460

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EP - 4273

JO - Physical Review B-Condensed Matter

JF - Physical Review B-Condensed Matter

IS - 9

ER -

Critical behavior of anisotropic cubic systems

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