Physics – Condensed Matter – Statistical Mechanics
Scientific paper
2002-11-28
Physics
Condensed Matter
Statistical Mechanics
13 pages, 3 figures, 10 tables, Tex
Scientific paper
The critical behavior at the special surface transition and crossover bevavior from special to ordinary surface transition in semi-infinite n-component anisotropic cubic models are investigated by applying the field theoretic approach directly in d=3 dimensions up to the two-loop approximation. The crossover behavior for random semi-infinite Ising-like system, which is the nontrivial particular case of the cubic model in the limit $n\to 0$, is also investigated. The numerical estimates of the resulting two-loop series expansions for the critical exponents of the special surface transition, surface crossover critical exponent $\Phi$ and the surface critical exponents of the layer, $\alpha_{1}$, and local specific heats, $\alpha_{11}$, are computed by means of Pade and Pade-Borel resummation techniques. For $n
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