Evidence of Two Distinct Dynamic Critical Exponents in Connection with Vortex Physics
arXiv:cond-mat/0105323 · doi:10.1103/PhysRevLett.87.037002
Abstract
The dynamic critical exponent $z$ is determined from numerical simulations for the three-dimensional (3D) lattice Coulomb gas (LCG) and the 3D XY models with relaxational dynamics. It is suggested that the dynamics is characterized by two distinct dynamic critical indices $z_0$ and $z$ related to the divergence of the relaxation time $Ï$ by $Ï\propto ξ^{z_0}$ and $Ï\propto k^{-z}$, where $ξ$ is the correlation length and $k$ the wavevector. The values determined are $z_0\approx 1.5$ and $z\approx 1$ for the 3D LCG and $z_0\approx 1.5$ and $z\approx 2$ for the 3D XY model. It is argued that the nonlinear $IV$ exponent relates to $z_0$, whereas the usual Hohenberg-Halperin classification relates to $z$. Possible implications for the interpretation of experiments are pointed out. Comparisons with other existing results are discussed.
to appear in PRL