Gabor Z. Pete, Ph.D. - Publications

Affiliations: 
2006 University of California, Berkeley, Berkeley, CA, United States 
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12 high-probability publications. We are testing a new system for linking publications to authors. You can help! If you notice any inaccuracies, please sign in and mark papers as correct or incorrect matches. If you identify any major omissions or other inaccuracies in the publication list, please let us know.

Year Citation  Score
2018 Medvedev A, Pete G. Speeding up non-Markovian first-passage percolation with a few extra edges Advances in Applied Probability. 50: 858-886. DOI: 10.1017/Apr.2018.39  0.386
2017 Ahlberg D, Steif JE, Pete G. Scaling limits for the threshold window: When does a monotone Boolean function flip its outcome? Annales De L Institut Henri Poincare-Probabilites Et Statistiques. 53: 2135-2161. DOI: 10.1214/16-Aihp786  0.311
2015 Hammond A, Pete G, Schramm O. Local time on the exceptional set of dynamical percolation and the incipient infinite cluster Annals of Probability. 43: 2949-3005. DOI: 10.1214/14-Aop950  0.532
2014 Duminil-Copin H, Garban C, Pete G. The Near-Critical Planar FK-Ising Model Communications in Mathematical Physics. 326: 1-35. DOI: 10.1007/S00220-013-1857-0  0.302
2013 Garban C, Pete G, Schramm O. Pivotal, cluster, and interface measures for critical planar percolation Journal of the American Mathematical Society. 26: 939-1024. DOI: 10.1090/S0894-0347-2013-00772-9  0.308
2012 Hammond A, Mossel E, Pete G. Exit time tails from pairwise decorrelation in hidden Markov chains, with applications to dynamical percolation Electronic Journal of Probability. 17. DOI: 10.1214/Ejp.V17-2229  0.531
2011 Nekrashevych V, Pete G. Scale-invariant groups Groups, Geometry, and Dynamics. 5: 139-167. DOI: 10.4171/Ggd/119  0.305
2010 Garban C, Pete G, Schramm O. The Fourier spectrum of critical percolation Acta Mathematica. 205: 19-104. DOI: 10.1007/S11511-010-0051-X  0.386
2010 Peres Y, Pete G, Somersille S. Biased tug-of-war, the biased infinity Laplacian, and comparison with exponential cones Calculus of Variations and Partial Differential Equations. 38: 541-564. DOI: 10.1007/S00526-009-0298-2  0.456
2008 Pete G. A note on percolation on $Z^d$: isoperimetric profile via exponential cluster repulsion Electronic Communications in Probability. 13: 377-392. DOI: 10.1214/Ecp.V13-1390  0.393
2008 Pete G. Corner percolation on ℤ2 and the square root of 17 Annals of Probability. 36: 1711-1747. DOI: 10.1214/07-Aop373  0.35
2006 Balogh J, Peres Y, Pete G. Bootstrap percolation on infinite trees and non-amenable groups Combinatorics Probability and Computing. 15: 715-730. DOI: 10.1017/S0963548306007619  0.465
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