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Mathematics Research Report MRR95-073
Exact Solution And Surface Critical Behaviour Of Open Cyclic SOS Lattice
Models
Yu-Kui Zhou and Murray T. Batchelor
Abstract:
We consider the L-state cyclic solid-on-solid lattice
models under a class of open boundary conditions. The integrable
boundary face weights are obtained by solving the
reflection equations. Functional relations for
the fused transfer matrices are presented for
both periodic and open boundary conditions. The
eigen-spectra of the unfused transfer matrix is
obtained from the functional relations
using the analytic Bethe ansatz.
For a special case of crossing parameter
$\lambda=\pi/L$, the finite-size corrections to the
eigen-spectra of the critical models are obtained, from which
the corresponding conformal dimensions follow.
The calculation of the surface free energy away from
criticality yields two surface specific heat exponents,
$\alpha_s=2-L/2s$ and $\alpha_1=1-L/s$, where
$s=1,2,\cdots,L-1$ coprime to L. These results are in agreement
with
the scaling relations $\alpha_s=\alpha_b+\nu$ and
$\alpha_1=\alpha_b-1$.
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