Six-vertex model, roughened surfaces, and an asymmetric spin Hamiltonian
- 10 February 1992
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review Letters
- Vol. 68 (6) , 725-728
- https://doi.org/10.1103/physrevlett.68.725
Abstract
For a particular choice of vertex weights, the two-dimensional six-vertex model can be viewed as a probabilistic cellular automaton. Physically it describes then the surface slope of a two-dimensional solid which grows through deposition. Based on this analogy we predict the large-scale asymptotic behavior of the vertical polarization correlations. The transfer matrix commutes with a nonsymmetric spin Hamiltonian. We diagonalize it using the Bethe ansatz and prove that the dynamical scaling exponent for kinetic roughening is z=3/2 in 1+1 dimensions.Keywords
This publication has 15 references indexed in Scilit:
- Statistical mechanics of probabilistic cellular automataJournal of Statistical Physics, 1990
- Rigorous derivation of domain growth kinetics without conservation lawsJournal of Statistical Physics, 1990
- From equilibrium spin models to probabilistic cellular automataJournal of Statistical Physics, 1989
- Dynamic Scaling of Growing InterfacesPhysical Review Letters, 1986
- Excess Noise for Driven Diffusive SystemsPhysical Review Letters, 1985
- Spectrum and scattering of excitations in the one-dimensional isotropic Heisenberg modelJournal of Mathematical Sciences, 1984
- Exact Solution of a Model of Two-Dimensional Ferroelectrics in an Arbitrary External Electric FieldPhysical Review Letters, 1967
- Exact Solution of a Model of Two-Dimensional Ferroelectrics in an Arbitrary External Electric FieldPhysical Review Letters, 1967
- Linear Magnetic Chains with Anisotropic CouplingPhysical Review B, 1964
- Zur Theorie der MetalleThe European Physical Journal A, 1931