Vortex lines in the three-dimensional XY model with random phase shifts
arXiv:cond-mat/9604111 · doi:10.1103/PhysRevB.54.16024
Abstract
The stability of the ordered phase of the three-dimensional XY-model with random phase shifts is studied by considering the roughening of a single stretched vortex line due to the disorder. It is shown that the vortex line may be described by a directed polymer Hamiltonian with an effective random potential that is long range correlated. A Flory argument estimates the roughness exponent to $ζ=3/4$ and the energy fluctuation exponent to $Ï=1/2$, thus fulfilling the scaling relation $Ï=2ζ-1$. The Schwartz-Edwards method as well as a numerical integration of the corresponding Burger's equation confirm this result. Since $ζ<1$ the ordered phase of the original XY-model is stable.
8 pages RevTeX, 3 eps-figures included