A theorem on the absence of phase transitions in one-dimensional growth models with onsite periodic potentials
arXiv:cond-mat/0112026 · doi:10.1088/0305-4470/35/10/303
Abstract
We rigorously prove that a wide class of one-dimensional growth models with onsite periodic potential, such as the discrete sine-Gordon model, have no phase transition at any temperature $T>0$. The proof relies on the spectral analysis of the transfer operator associated to the models. We show that this operator is Hilbert-Schmidt and that its maximum eigenvalue is an analytic function of temperature.
6 pages, no figures, submitted to J Phys A: Math Gen