TY - JOUR
T1 - Skeleton inequalities and mean field properties for lattice spin systems
AU - Hara, Takashi
AU - Hattori, Tetsuya
AU - Tasaki, Hal
N1 - Copyright:
Copyright 2017 Elsevier B.V., All rights reserved.
PY - 1985
Y1 - 1985
N2 - We present a proof of skeleton inequalities for ferromagnetic lattice spin systems with potential V(φ2) = (a/2)φ2 + Σn = 2M {λ2n/(2n)!} φ2n (a real, λ2n ≥0) generalizing the Brydges-Fröhlich-Sokal and Bovier-Felder methods. As an application of the inequalities, we prove that, for sufficiently soft systems in d > 4 dimensions, critical exponents γ, α, and Δ4 take their mean-field values (i.e., γ = 1, α = 0, and Δ4 = 3/2).
AB - We present a proof of skeleton inequalities for ferromagnetic lattice spin systems with potential V(φ2) = (a/2)φ2 + Σn = 2M {λ2n/(2n)!} φ2n (a real, λ2n ≥0) generalizing the Brydges-Fröhlich-Sokal and Bovier-Felder methods. As an application of the inequalities, we prove that, for sufficiently soft systems in d > 4 dimensions, critical exponents γ, α, and Δ4 take their mean-field values (i.e., γ = 1, α = 0, and Δ4 = 3/2).
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U2 - 10.1063/1.526719
DO - 10.1063/1.526719
M3 - Article
AN - SCOPUS:0039807897
SN - 0022-2488
VL - 26
SP - 2922
EP - 2929
JO - Journal of Mathematical Physics
JF - Journal of Mathematical Physics
IS - 11
ER -