Robert Joseph Adler
Affiliations: | McGill University, Montreal, QC, Canada |
Google:
"Robert Adler"Mean distance: (not calculated yet)
Parents
Sign in to add mentorAbraham Michael Hasofer | grad student | 1977 | University of New South Wales | |
(https://prabook.com/web/abraham_michael.hasofer/377211) |
BETA: Related publications
See more...
Publications
You can help our author matching system! If you notice any publications incorrectly attributed to this author, please sign in and mark matches as correct or incorrect. |
Feng R, Adler RJ. (2019) Critical radius and supremum of random spherical harmonics Annals of Probability. 47: 1162-1184 |
Pranav P, Weygaert Rvd, Vegter G, et al. (2019) Topology and geometry of Gaussian random fields I : On Betti numbers, Euler characteristic, and Minkowski functionals Monthly Notices of the Royal Astronomical Society. 485: 4167-4208 |
Pranav P, Adler RJ, Buchert T, et al. (2019) Unexpected topology of the temperature fluctuations in the cosmic microwave background Astronomy & Astrophysics. 627: A163 |
Adler RJ, Agami S, Pranav P. (2017) Modeling and replicating statistical topology and evidence for CMB nonhomogeneity. Proceedings of the National Academy of Sciences of the United States of America |
Krishnan SR, Taylor JE, Adler RJ. (2017) The Intrinsic geometry of some random manifolds Electronic Communications in Probability. 22 |
Owada T, Adler RJ. (2017) Limit theorems for point processes under geometric constraints (and topological crackle) Annals of Probability. 45: 2004-2055 |
Naitzat G, Adler RJ. (2017) A central limit theorem for the Euler integral of a Gaussian random field Stochastic Processes and Their Applications. 127: 2036-2067 |
Adler RJ, Krishnan SR, Taylor JE, et al. (2017) Convergence of the reach for a sequence of Gaussian-embedded manifolds Probability Theory and Related Fields. 171: 1045-1091 |
Yogeshwaran D, Adler RJ. (2015) On the topology of random complexes built over stationary point processes Annals of Applied Probability. 25: 3338-3380 |
Yogeshwaran D, Subag E, Adler RJ. (2015) Random geometric complexes in the thermodynamic regime Probability Theory and Related Fields. 1-36 |