Convergence of nonperturbative approximations to the renormalization group I Balog, H Chaté, B Delamotte, M Marohnić, N Wschebor Physical Review Letters 123 (24), 240604, 2019 | 103 | 2019 |
Precision calculation of critical exponents in the O (N) universality classes with the nonperturbative renormalization group G De Polsi, I Balog, M Tissier, N Wschebor Physical Review E 101 (4), 042113, 2020 | 91 | 2020 |
Dynamical conductivity and its fluctuations along the crossover to many-body localization OS Barišić, J Kokalj, I Balog, P Prelovšek arXiv:1603.02889, 2016 | 76 | 2016 |
Criticality of the random field Ising model in and out of equilibrium: A nonperturbative functional renormalization group description I Balog, G Tarjus, M Tissier Physical Review B 97 (9), 094204, 2018 | 36 | 2018 |
Critical scaling in random-field systems: 2 or 3 independent exponents? G Tarjus, I Balog, M Tissier Europhysics Letters 103 (6), 61001, 2013 | 25 | 2013 |
Conformal invariance in the nonperturbative renormalization group: a rationale for choosing the regulator I Balog, G De Polsi, M Tissier, N Wschebor Physical Review E 101 (6), 062146, 2020 | 20 | 2020 |
Activated dynamic scaling in the random-field Ising model: a nonperturbative functional renormalization group approach I Balog, G Tarjus arXiv:1501.05770, 2015 | 19 | 2015 |
Disorder-driven quantum transition in relativistic semimetals: functional renormalization via the porous medium equation I Balog, D Carpentier, AA Fedorenko Physical review letters 121 (16), 166402, 2018 | 18 | 2018 |
Same universality class for the critical behavior in and out of equilibrium in a quenched random field I Balog, M Tissier, G Tarjus Physical Review B 89, 104201, 2014 | 13 | 2014 |
Dimensional reduction breakdown and correction to scaling in the random-field Ising model I Balog, G Tarjus, M Tissier Physical Review E 102 (6), 062154, 2020 | 10 | 2020 |
Fixed points and their stability in the functional renormalization group of random field models M Baczyk, G Tarjus, M Tissier, I Balog Journal of Statistical Mechanics: Theory and Experiment 2014 (6), P06010, 2014 | 8 | 2014 |
Invaded cluster algorithm for a tricritical point in a diluted Potts model I Balog, K Uzelac Physical Review E 76 (1), 011103, 2007 | 8 | 2007 |
Benchmarking the nonperturbative functional renormalization group approach on the random elastic manifold model in and out of equilibrium I Balog, G Tarjus, M Tissier Journal of Statistical Mechanics: Theory and Experiment 2019 (10), 103301, 2019 | 7 | 2019 |
Critical probability distributions of the order parameter from the functional renormalization group I Balog, A Rançon, B Delamotte Physical Review Letters 129 (21), 210602, 2022 | 6 | 2022 |
Critical behaviour of the random-field Ising model with long-range interactions in one dimension I Balog, G Tarjus, M Tissier Journal of Statistical Mechanics: Theory and Experiment 2014 (10), P10017, 2014 | 6 | 2014 |
Quenched disorder: demixing thermal and disorder fluctuations I Balog, K Uzelac Physical Review E 86 (6), 061124, 2012 | 4 | 2012 |
On the effective action in presence of local non-linear constraints A Rançon, I Balog Journal of Statistical Mechanics: Theory and Experiment 2019 (3), 033215, 2019 | 3 | 2019 |
Equilibriumlike extension of the invaded cluster algorithm I Balog, K Uzelac Physical Review E 77 (5), 050101, 2008 | 3 | 2008 |
Inhomogeneities on all scales at a phase transition altered by disorder I Balog, K Uzelac Physical Review E 85 (3), 030101, 2012 | 2 | 2012 |
Renormalization group and generalized Central Limit Theorems: The critical probability distributions of the order parameter of the Ising model I Balog, A Rançon, B Delamotte Physical Review Letters 129, 210602, 2022 | 1 | 2022 |