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[2]    Aizenman, M., Duminil-Copin, H., Sidoravicius, V., Random currents and continuity of Ising model’s spontaneous magnetization, Comm. Math. Phys., 334 (2015), 719-742.
[3]    Balogh, J., Bollobás, B., Duminil-Copin, H., Morris, R., The sharp threshold for bootstrap percolation in all dimensions, Trans. Amer. Math.Soc., 364 (2012), 2667-2701.
[4]    Beffara, V., Duminil-Copin, H., The self-dual point of the two-dimensional random-cluster model is critical for q ≥ 1, Probab. Theory Related Fields, 153 (2012), 511-542.
[5]    Benjamini, I., Duminil-Copin, H., Kozma, G., Yadin, A., Disorder, entropy and harmonic functions, Ann. Probab., 43 (2015), 2332-2373.
[6]    Chelkak, D., Duminil-Copin, H., Hongler, C., Crossing probabilities in topological rectangles for the critical planar FK-Ising model, Electron. J. Probab., 21 (2016), paper no. 5.
[7]    Duminil-Copin, H., Parafermionic Observables and Their Applications to Planar Statistical Physics Models, Ensaios Matemáticos, vol. 25, Sociedade Brasileira de Matemática, Rio de Janeiro, 2013.
[8]    Duminil-Copin, H., Order/disorder phase transitions: the example of the Potts model, in Current Developments in Mathematics 2015, Int. Press, Somerville, MA, 2016, 27-71.
[9]    Duminil-Copin, H., Random currents expansion of the Ising model, in European Congress of Mathematics, Eur. Math. Soc., Zürich, 2018, 869-889.

[10]    Duminil-Copin, H., Sixty years of percolation, in Proceedings of the International Congress of Mathematicians–Rio de Janeiro 2018, vol. IV, Invited lectures, World Sci. Publ., Hackensack, NJ, 2018, 2829-2856.
[11]    Duminil-Copin, H., Sharp threshold phenomena in statistical physics, Jpn. J. Math., 14 (2019), 1-25.
[12]    Lectures on the Ising and Potts models on the hypercubic lattice, in Random Graphs, Phase Transitions, and the Gaussian Free Field, Springer Proc. Math. Stat., vol. 304, Springer, Cham, 2020, 35-161.
[13]    Duminil-Copin, H., Gagnebin, M., Harel, M., Manolescu, I., Tassion, V., Discontinuity of the phase transition for the planar random-cluster and 0115 models with q> 4, Ann. 5٥. Ec. Norm. 51/767:, 54 (2021), 1363-1413.
[14]    Duminil-Copin, H., Glazman, A., Hammond, A., Manolescu, I., On the probability that selfavoiding walk ends at a given point, Ann. Probab., 44 (2016), 955-983.
[15]    Duminil-Copin, H., Goswami, S., Raoufi, A., . Severo, F., Yadin, A., Existence of phase transition for percolation using the Gaussian free field, Duke Math. J., 169 (2020), 3539-3563.
[16]    Duminil-Copin, H., Goswami, S., Rodriguez, P-F. , Severo, F., Equality of critical parameters for percolation of gaussian free field level-sets (2020), available at arXiv: 2002.07735.
[17]    Duminil-Copin, H., Hammond, A., Self-avoiding walk is sub-ballistic, Comm. Math. Phys., 324 (2013), 401-423.
[18]    Duminil-Copin, H., Hongler, C., Nolin, P., Connection probabilities and RSW-type bounds for the two-dimensional FK Ising model, Comm. Pure Appl. Math., 64 (2011), 1165-1198.
[19]    Duminil-Copin, H., Kozlowski, K. K., Krachun, D., Manolescu, I., Oulamara, M., Rotational invariance in critical planar lattice models (2020), available at arXiv: 2012.11672.
[20]    Duminil-Copin, H., Kozma, G., Yadin, A., Supercritical self-avoiding walks are space-filling, Ann. Inst. Henri Poincaré Probab. Stat., 50 (2014), 315-326.
[21]    Duminil-Copin, H., Li, J.-H., Manolescu, I., Universality for the random-cluster model on isoradial graphs, Electron. J. Probab., 23 (2018), paper no. 96.
[22]    Duminil-Copin, H., Manolescu, I., Planar random-cluster model: scaling relations (2020), available at arXiv: 2011.15090.
[23]    Duminil-Copin, H., Raoufi, A., Tassion, V., Exponential decay of connection probabilities for sub-critical Voronoi percolation in Rd, Probab. Theory Related Fields, 173 (2019), 479-490.
[24]    Duminil-Copin, H., Raoufi, A., Tassion, V., Sharp phase transition for the random-cluster and Potts models via decision trees, Ann. of Math., 189 (2019), 75-99.
[25]    Duminil-Copin, H., Sidoravicius, V., Tassion, V., Continuity of the phase transition for planar random-cluster and 0115 models with 1 ک q 4 ک, Comm. Math. Phys., 349 (2017), 47-107.
[26]    Duminil-Copin, H., Smirnov, S., The connective constant of the honeycomb lattice equals 2 + √2, Ann. of Math., 175 (2012), 1653-1665.