Biography:Andrew Granville

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Short description: British mathematician (born 1962)
Andrew Granville
Born7 September 1962 (1962-09-07) (age 61)
NationalityBritish
Alma materQueen's University
AwardsRibenboim Prize (1999)
Chauvenet Prize (2008) Paul R. Halmos – Lester R. Ford Award (2007, 2009)
Scientific career
FieldsMathematics
InstitutionsUniversité de Montréal
University of Georgia
Doctoral advisorPaulo Ribenboim
Doctoral studentsErnest S. Croot III
Websitedms.umontreal.ca/~andrew/

Andrew James Granville (born 7 September 1962) is a British mathematician, working in the field of number theory.

He has been a faculty member at the Université de Montréal since 2002. Before moving to Montreal he was a mathematics professor at the University of Georgia (UGA) from 1991 until 2002. He was a section speaker in the 1994 International Congress of Mathematicians together with Carl Pomerance from UGA.

Granville received his Bachelor of Arts (Honours) (1983) and his Certificate of Advanced Studies (Distinction) (1984) from Trinity College, Cambridge University. He received his PhD from Queen's University in 1987[1] and was inducted into the Royal Society of Canada in 2006.

Granville's work is mainly in number theory, in particular analytic number theory. Along with Carl Pomerance and W. R. (Red) Alford he proved the infinitude of Carmichael numbers in 1994.[2] This proof was based on a conjecture given by Paul Erdős.

Granville won a Lester R. Ford Award in 2007[3] and again in 2009.[4] In 2008, he won the Chauvenet Prize for expository writing from the Mathematical Association of America for his paper "It is easy to determine whether a given integer is prime".[5][6] In 2012, he became a fellow of the American Mathematical Society.[7]

Andrew Granville, in collaboration with Jennifer Granville, has written "Prime Suspects: The Anatomy of Integers and Permutations", a graphic novel that investigates key concepts in Mathematics.[8]

References

  1. Andrew Granville at the Mathematics Genealogy Project
  2. W. R. Alford; Andrew Granville; Carl Pomerance (1994). "There are infinitely many Carmichael numbers". Annals of Mathematics 139 (3): 703–722. doi:10.2307/2118576. http://math.dartmouth.edu/~carlp/PDF/paper95.pdf. 
  3. Andrew Granville; Greg Martin (2006). "Prime Number Races". Amer. Math. Monthly 113 (1): 1–33. doi:10.2307/27641834. http://www.maa.org/programs/maa-awards/writing-awards/prime-number-races. 
  4. Andrew Granville (2008). "Prime Number Patterns". Amer. Math. Monthly 115 (4): 279–296. doi:10.1080/00029890.2008.11920529. http://www.maa.org/programs/maa-awards/writing-awards/prime-number-patterns. 
  5. Andrew Granville (2005). "It is easy to determine whether a given integer is prime". Bulletin of the American Mathematical Society 42 (1): 3–38. doi:10.1090/S0273-0979-04-01037-7. https://www.ams.org/bull/2005-42-01/S0273-0979-04-01037-7/S0273-0979-04-01037-7.pdf. 
  6. "MAA Chauvenet Prize page". http://www.maa.org/Awards/chauvent.html. 
  7. List of Fellows of the American Mathematical Society, retrieved 2013-01-19.
  8. Andrew Granville; Jennifer Granville (2019). Prime Suspects: The Anatomy of Integers and Permutations. Princeton University Press. ISBN 978-0691149158. 

External links