Surface and bulk transitions in three-dimensional O(n) models
Abstract
Using Monte Carlo methods and finite-size scaling, we investigate surface criticality in the O(n) models on the simple-cubic lattice with n=1, 2, and 3, i.e. the Ising, XY, and Heisenberg models. For the critical couplings we find K c(n=2)=0.454 1655 (10) and K c(n=3)= 0.693 002 (2). We simulate the three models with open surfaces and determine the surface magnetic exponents at the ordinary transition to be yh1 (o)=0.7374 (15), 0.781 (2), and 0.813 (2) for n=1, 2, and 3, respectively. Then we vary the surface coupling K1 and locate the so-called special transition at c (n=1)=0.50214 (8) and c (n=2)=0.6222 (3), where =K1/K-1. The corresponding surface thermal and magnetic exponents are yt1 (s) =0.715 (1) and yh1 (s) =1.636 (1) for the Ising model, and yt1 (s) =0.608 (4) andyh1 (s) =1.675 (1) for the XY model. Finite-size corrections with an exponent close to -1/2 occur for both models. Also for the Heisenberg model we find substantial evidence for the existence of a special surface transition.
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