The Specific Heat of a Ferromagnetic Film.
Abstract
We analyze the specific heat for the O(N) vector model on a d-dimensional film geometry of thickness L using ``environmentally friendly'' renormalization. We consider periodic, Dirichlet and antiperiodic boundary conditions, deriving expressions for the specific heat and an effective specific heat exponent, α. In the case of d=3, for N=1, by matching to the exact exponent of the two dimensional Ising model we capture the crossover for L∞ between power law behaviour in the limit LL∞ and logarithmic behaviour in the limit LL0 for fixed L, where L is the correlation length in the transverse dimensions.
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