6533b82bfe1ef96bd128e140

RESEARCH PRODUCT

Finite-size-scaling study of the simple cubic three-state Potts glass: Possible lower critical dimension d=3.

Kurt BinderM. ScheucherA. P. YoungJ. D. Reger

subject

Physicssymbols.namesakeDistribution functionExponential distributionGaussiansymbolsCubic crystal systemHamiltonian (quantum mechanics)Critical dimensionScalingMathematical physicsPotts model

description

For small lattices with linear dimension L ranging from L=3 to L=8 we obtain the distribution function P(q) of the overlap q between two real replicas of the three-state Potts-glass model with symmetric nearest-neighbor interaction with a Gaussian distribution. A finite-size-scaling analysis suggests a zero-temperature transition to occur with an exponentially diverging correlation length ${\ensuremath{\xi}}_{\mathrm{SG}}$\ensuremath{\sim}exp(C/${\mathit{T}}^{\mathrm{\ensuremath{\sigma}}}$). This implies that d=3 is the lower critical dimension.

yearjournalcountryeditionlanguage
1990-10-01Physical review. B, Condensed matter
10.1103/physrevb.42.6881https://pubmed.ncbi.nlm.nih.gov/9994811