Macroscopic loops in the loop O (n) model at Nienhuis' critical point. H Duminil-Copin, A Glazman, R Peled, Y Spinka
Journal of the European Mathematical Society (EMS Publishing) 23 (1), 2021
44 2021 On the transition between the disordered and antiferroelectric phases of the 6-vertex model A Glazman, R Peled
Electronic Journal of Probability 28, 1-53, 2023
35 2023 Uniform Lipschitz functions on the triangular lattice have logarithmic variations A Glazman, I Manolescu
Communications in mathematical physics 381 (3), 1153-1221, 2021
28 2021 Discrete stress-energy tensor in the loop O (n) model D Chelkak, A Glazman, S Smirnov
arXiv preprint arXiv:1604.06339, 2016
24 2016 On the probability that self-avoiding walk ends at a given point H Duminil-Copin, A Glazman, A Hammond, I Manolescu
20 2016 Connective constant for a weighted self-avoiding walk on A Glazman
18 2015 Phase diagram of the Ashkin–Teller model Y Aoun, M Dober, A Glazman
Communications in Mathematical Physics 405 (2), 37, 2024
11 2024 Macroscopic loops in the loop~ model via the XOR trick N Crawford, A Glazman, M Harel, R Peled
arXiv preprint arXiv:2001.11977, 2020
8 2020 Structure of Gibbs measure for planar FK-percolation and Potts models A Glazman, I Manolescu
Probability and Mathematical Physics 4 (2), 209-256, 2023
7 2023 Exponential Decay in the Loop O (n ) Model on the Hexagonal Lattice for n > 1 and A Glazman, I Manolescu
In and Out of Equilibrium 3: Celebrating Vladas Sidoravicius, 455-470, 2021
6 * 2021 Delocalisation and continuity in 2D: loop O (2), six-vertex, and random-cluster models A Glazman, P Lammers
arXiv preprint arXiv:2306.01527, 2023
5 2023 Self-avoiding walk on Z2 with Yang-Baxter weights: universality of critical fugacity and 2-point function A Glazman, I Manolescu
arXiv preprint arXiv:1708.00395, 2017
1 2017 Discontinuous transition in 2D Potts: I. Order-Disorder Interface convergence M Dober, A Glazman, S Ott
arXiv preprint arXiv:2502.04129, 2025
2025 On loops in the complement to dimers A Glazman, L Rey
arXiv preprint arXiv:2412.11708, 2024
2024 Self-avoiding walk on with Yang–Baxter weights: Universality of critical fugacity and 2-point function A Glazman, I Manolescu
2020 Properties of self-avoiding walks and a stress-energy tensor in the O (n) model A Glazman
éditeur non identifié, 2016
2016 Gibbs measures for the two-dimensional Potts model AL Glazman
Université de Geneve Faculté des Sciences A Glazman
THE ANNALS J BLATH, M HAMMER, M ORTGIESE, D MALICET, G MIJOULE, G POLY, ...
Self-avoiding walk on Z 2 with Yang–Baxter weights: universality of critical fugacity and 2-point function Marches auto-évitantes sur Z 2 avec des poids de Yang–Baxter … A Glazman, I Manolescu