Cutoff and lattice effects in the 4 theory of confined systems
Abstract
We study cutoff and lattice effects in the O(n) symmetric φ4 theory for a d-dimensional cubic geometry of size L with periodic boundary conditions. In the large-N limit above Tc, we show that φ4 field theory at finite cutoff predicts the nonuniversal deviation ( L)-2 from asymptotic bulk critical behavior that violates finite-size scaling and disagrees with the deviation e-cL that we find in the φ4 lattice model. The exponential size dependence requires a non-perturbative treatment of the φ4 model. Our arguments indicate that these results should be valid for general n and d > 2.
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