Discontinuity of the phase transition for the planar random-cluster and Potts models with H Duminil-Copin, M Gagnebin, M Harel, I Manolescu, V Tassion
arXiv preprint arXiv:1611.09877, 2016
80 2016 Inhomogeneous bond percolation on square, triangular and hexagonal lattices GR Grimmett, I Manolescu
49 2013 Scaling limits and influence of the seed graph in preferential attachment trees N Curien, T Duquesne, I Kortchemski, I Manolescu
Journal de l’École polytechnique—Mathématiques 2, 1-34, 2015
46 2015 Universality for the random-cluster model on isoradial graphs H Duminil-Copin, JH Li, I Manolescu
41 2018 Bond percolation on isoradial graphs: criticality and universality GR Grimmett, I Manolescu
Probability Theory and Related Fields 159, 273-327, 2014
41 2014 Planar lattices do not recover from forest fires D Kiss, I Manolescu, V Sidoravicius
The Annals of Probability, 3216-3238, 2015
30 2015 Planar random-cluster model: fractal properties of the critical phase H Duminil-Copin, I Manolescu, V Tassion
Probability Theory and Related Fields 181 (1), 401-449, 2021
29 2021 Discontinuity of the phase transition for the planar random-cluster and Potts models with q> 4 H Duminil-Copin, M Gagnebin, M Harel, I Manolescu, V Tassion
Annales scientifiques de l'École Normale Supérieure 54 (6), 1363-1413, 2021
27 2021 Uniform Lipschitz functions on the triangular lattice have logarithmic variations A Glazman, I Manolescu
Communications in mathematical physics 381 (3), 1153-1221, 2021
26 2021 Delocalization of the height function of the six-vertex model H Duminil-Copin, A Karrila, I Manolescu, M Oulamara
arXiv preprint arXiv:2012.13750, 2020
25 2020 The phase transitions of the planar random-cluster and Potts models with q≥ 1 are sharp H Duminil-Copin, I Manolescu
25 2014 Universality for bond percolation in two dimensions GR Grimmett, I Manolescu
24 2013 Rotational invariance in critical planar lattice models H Duminil-Copin, KK Kozlowski, D Krachun, I Manolescu, M Oulamara
arXiv preprint arXiv:2012.11672, 2020
21 2020 The Bethe ansatz for the six-vertex and XXZ models: An exposition H Duminil-Copin, M Gagnebin, M Harel, I Manolescu, V Tassion
20 2018 On the probability that self-avoiding walk ends at a given point H Duminil-Copin, A Glazman, A Hammond, I Manolescu
18 2016 Planar random-cluster model: scaling relations H Duminil-Copin, I Manolescu
Forum of Mathematics, Pi 10, e23, 2022
14 2022 On the six-vertex model’s free energy H Duminil-Copin, KK Kozlowski, D Krachun, I Manolescu, ...
Communications in Mathematical Physics 395 (3), 1383-1430, 2022
12 2022 BOUNDING THE NUMBER OF SELF-AVOIDING WALKS H Duminil-Copin, S Ganguly, A Hammond, I Manolescu
The Annals of Probability 48 (4), 1644-1692, 2020
10 2020 Universality for planar percolation I Manolescu
University of Cambridge, 2012
7 2012 Exponential decay in the loop model: , A Glazman, I Manolescu
arXiv preprint arXiv:1810.11302, 2018
6 * 2018