6533b824fe1ef96bd128166f
RESEARCH PRODUCT
High-Temperature Series Analysis of the Free Energy and Susceptibility of the 2D Random-Bond Ising Model
Wolfhard JankeWolfhard JankeJoan AdlerAlexandra Rodersubject
Statistics and ProbabilityPhysicsSeries (mathematics)Condensed Matter (cond-mat)CrossoverFOS: Physical sciencesCondensed MatterCondensed Matter PhysicsCoupling (probability)Distribution (mathematics)SingularityIsing modelCondensed Matter::Strongly Correlated ElectronsSeries expansionEnergy (signal processing)Mathematical physicsdescription
We derive high-temperature series expansions for the free energy and susceptibility of the two-dimensional random-bond Ising model with a symmetric bimodal distribution of two positive coupling strengths J_1 and J_2 and study the influence of the quenched, random bond-disorder on the critical behavior of the model. By analysing the series expansions over a wide range of coupling ratios J_2/J_1, covering the crossover from weak to strong disorder, we obtain for the susceptibility with two different methods compelling evidence for a singularity of the form $\chi \sim t^{-7/4} |\ln t|^{7/8}$, as predicted theoretically by Shalaev, Shankar, and Ludwig. For the specific heat our results are less convincing, but still compatible with the theoretically predicted log-log singularity.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 1999-05-18 |