Add to ORKGWe consider the Ising model between 2 and 4 dimensions perturbed by quenched disorder in the strength of the interaction between nearby spins. In the interval 2 < d < 4 this disorder is a relevant perturbation that drives the system to a new fixed point of the renormalization group. At d = 2 such disorder is marginally irrelevant and can be studied using conformal perturbation theory. Combining conformal perturbation theory with recent results from the conformal bootstrap we compute some scaling exponents in an expansion around d = 2. If one trusts these computations also in d = 3, one finds results consistent with experimental data and Monte Carlo simulations. In addition, we perform a direct uncontrolled computation in d = 3 using new res...
We discuss different approaches to the study of the effect of disorder in the three-dimensional Isin...
We study the nonconserved phase ordering dynamics of the d = 2, 3 random field Ising model, quenched...
Using an exact method, we numerically study the zero-temperature roughness of interfaces in the rand...
We consider the Ising model between 2 and 4 dimensions perturbed by quenched disorder in the strengt...
In this paper we provide new analytic results on two-dimensional $q$-Potts models ($q \geq 2$) in th...
The random-field Ising model is one of the few disordered systems where the perturbative renormaliza...
v2=final version (21 pages, 6 figures)International audienceFor the quantum Ising chain, the self-du...
We solve a long-standing puzzle in statistical mechanics of disordered systems. By performing a high...
For random systems with quenched disorders distributed randomly in εR dimensions and perfectly corre...
The $d=2$ critical Ising model is described by an exactly solvable Conformal Field Theory (CFT). The...
We use scale invariant scattering theory to exactly determine the lines of renormalization group fix...
We study the nonconserved phase-ordering dynamics of the d=2,3 random-field Ising model, quenched to...
By performing a high-statistics simulation of the D=4 random-field Ising model at zero temperature f...
We give a brief survey of Ising spin systems in the presence of random bonds or random fields. Spec...
We consider the two-dimensional randomly site diluted Ising model and the random-bond +/- J Ising mo...
We discuss different approaches to the study of the effect of disorder in the three-dimensional Isin...
We study the nonconserved phase ordering dynamics of the d = 2, 3 random field Ising model, quenched...
Using an exact method, we numerically study the zero-temperature roughness of interfaces in the rand...
We consider the Ising model between 2 and 4 dimensions perturbed by quenched disorder in the strengt...
In this paper we provide new analytic results on two-dimensional $q$-Potts models ($q \geq 2$) in th...
The random-field Ising model is one of the few disordered systems where the perturbative renormaliza...
v2=final version (21 pages, 6 figures)International audienceFor the quantum Ising chain, the self-du...
We solve a long-standing puzzle in statistical mechanics of disordered systems. By performing a high...
For random systems with quenched disorders distributed randomly in εR dimensions and perfectly corre...
The $d=2$ critical Ising model is described by an exactly solvable Conformal Field Theory (CFT). The...
We use scale invariant scattering theory to exactly determine the lines of renormalization group fix...
We study the nonconserved phase-ordering dynamics of the d=2,3 random-field Ising model, quenched to...
By performing a high-statistics simulation of the D=4 random-field Ising model at zero temperature f...
We give a brief survey of Ising spin systems in the presence of random bonds or random fields. Spec...
We consider the two-dimensional randomly site diluted Ising model and the random-bond +/- J Ising mo...
We discuss different approaches to the study of the effect of disorder in the three-dimensional Isin...
We study the nonconserved phase ordering dynamics of the d = 2, 3 random field Ising model, quenched...
Using an exact method, we numerically study the zero-temperature roughness of interfaces in the rand...