Yakov Sinai
Affiliations: | Mathematics | Princeton University, Princeton, NJ |
Area:
dynamical systems, ergodic theory, and mathematical physics.Website:
https://www.math.princeton.edu/directory/yakov-sinaiGoogle:
"Yakov Sinai"Bio:
http://www.nasonline.org/member-directory/members/3008957.html
http://www-history.mcs.st-andrews.ac.uk/Mathematicians/Sinai.html
https://history.aip.org/phn/11609024.html
https://www.genealogy.math.ndsu.nodak.edu/id.php?id=10481
https://www.aps.org/programs/honors/prizes/heineman.cfm
Children
Sign in to add traineeSvetlana Jitomirskaya | grad student | ||
Konstantin Khanin | grad student | ||
Jonathan C. Mattingly | grad student | 1994-1998 | Princeton |
Toufic M. Suidan | grad student | 2001 | Princeton |
Alexander I. Bufetov | grad student | 2005 | Princeton |
Pavel Batchourine | grad student | 2006 | Princeton |
Francesco Cellarosi | grad student | 2011 | Princeton |
Percy Wong | grad student | 2013 | Princeton |
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Publications
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Cellarosi F, Sinai YG. (2013) Ergodic properties of square-free numbers Journal of the European Mathematical Society. 15: 1343-1374 |
Cellarosi F, Sinai YG. (2013) Non-standard limit theorems in number theory Springer Proceedings in Mathematics and Statistics. 33: 197-213 |
Cellarosi F, Sinai YG. (2011) The Möbius function and statistical mechanics Bulletin of Mathematical Sciences. 1: 245-275 |
Sinai Y. (2005) Absence of the local existence theorem in the critical space for the 3D-Navier-Stokes system International Journal of Bifurcation and Chaos in Applied Sciences and Engineering. 15: 3635-3637 |
Sinai Y. (2004) A theorem about uniform distribution Communications in Mathematical Physics. 252: 581-588 |
Weinan E, Mattingly JC, Sinai Y. (2001) Gibbsian dynamics and ergodicity for the stochastically forced Navier-Stokes equation Communications in Mathematical Physics. 224: 83-106 |
Weinan E, Khanin K, Mazel A, et al. (2000) Invariant measures for Burgers equation with stochastic forcing Annals of Mathematics. 151: 877-960 |
MATTINGLY JC, SINAI YG. (1999) AN ELEMENTARY PROOF OF THE EXISTENCE AND UNIQUENESS THEOREM FOR THE NAVIER–STOKES EQUATIONS Communications in Contemporary Mathematics. 1: 497-516 |
Weinan E, Khanin K, Mazel A, et al. (1997) Probability distribution functions for the random forced burgers equation Physical Review Letters. 78: 1904-1907 |
Hunt BR, Khanin KM, Sinai YG, et al. (1996) Fractal properties of critical invariant curves Journal of Statistical Physics. 85: 261-276 |