On the probability of staying above a wall for the (2+1)-dimensional SOS model at low temperature
arXiv:1406.1206 · doi:10.1007/s00440-015-0658-0
Abstract
We obtain sharp asymptotics for the probability that the (2+1)-dimensional discrete SOS interface at low temperature is positive in a large region. For a square region $Î$, both under the infinite volume measure and under the measure with zero boundary conditions around $Î$, this probability turns out to behave like $\exp(-Ï_β(0) L \log L )$, with $Ï_β(0)$ the surface tension at zero tilt, also called step free energy, and $L$ the box side. This behavior is qualitatively different from the one found for continuous height massless gradient interface models.
21 pages, 6 figures