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Mark Braverman (mathematician)

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Mark Braverman
Born1984 (1984)
NationalityIsraeli
Alma materUniversity of Toronto
Awards
Scientific career
FieldsComputer science
Institutions
Thesis Computability and Complexity of Julia Sets[1]  (2008)
Doctoral advisorStephen Cook
Websitewww.cs.princeton.edu/~mbraverm/pmwiki/index.php

Mark Braverman (born 1984) is an Israeli mathematician and theoretical computer scientist. He was awarded an EMS Prize in 2016 as well as Presburger Award in the same year.[2][3] In 2019, he was awarded the Alan T. Waterman Award.[4] In 2022, he won the IMU Abacus Medal.[5]

He earned his doctorate from the University of Toronto in 2008, under the supervision of Stephen Cook. After this, he did post-doctoral research at Microsoft Research and then joined the faculty at University of Toronto. In 2011, he joined the Princeton University department of computer science.[6] In 2014, he was an Invited Speaker with talk Interactive information and coding theory at the International Congress of Mathematicians in Seoul.[7]

Braverman is the son of mathematician Elena Braverman[8] and, through her, the grandson of his co-author, mathematical statistician Yan Petrovich Lumel'skii [ru].[9]

References

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  1. ^ Mark Braverman at the Mathematics Genealogy Project
  2. ^ 7ECM Laureates Retrieved 2018-04-18
  3. ^ The EATCS bestows the Presburger Award 2016 on Mark Braverman Retrieved 2018-04-18
  4. ^ "US NSF - Office of the Director - Alan T. Waterman Award". www.nsf.gov. Retrieved 2019-08-10.
  5. ^ "Mark Braverman Wins the IMU Abacus Medal". Quanta Magazine. 2022-07-05. Retrieved 2022-07-06.
  6. ^ Mark Braverman | Computer Science Department at Princeton University Retrieved 2018-04-18
  7. ^ Braverman, Mark (2014). "Interactive information and coding theory" (PDF). Proceedings of the I International Congress of Mathematicians. pp. 539–559.
  8. ^ For the connection between Elena and Mark Braverman, see the dedication of Mark Braverman's master's thesis, Computational Complexity of Euclidean Sets: Hyperbolic Julia Sets are Poly-Time Computable, University of Toronto, 2004.
  9. ^ Braverman, Mark; Lumelskii, Yan (2002), "Chebyshev systems and estimation theory for discrete distributions", Statistics & Probability Letters, 58 (2): 157–165, doi:10.1016/S0167-7152(02)00114-1, MR 1914914
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