Charles Brenner (mathematician)

For other persons named Charles Brenner, see Charles Brenner (disambiguation).
Charles Brenner
Born (1945-03-18) March 18, 1945
Princeton, New Jersey, U.S.
Nationality American
Alma mater Stanford University (BS)
UCLA (Ph.D.)
Thesis Asymptotics of Partition Functions (1984)
Doctoral advisors Basil Gordon[1]
Ernst Straus
Known for APL implementation, forensic mathematics
Website
dna-view.com

Charles Hallam Brenner is an American mathematician who is the originator of forensic mathematics. His father Joel Lee Brenner was a professor of mathematics and his mother Frances Hallam Brenner was a city councilor and briefly mayor of Palo Alto, California. His uncle Charles Brenner, MD was a psychiatrist.

Brenner received a BS from Stanford University in 1967 and a Ph.D. from UCLA in 1984.[1][2] His Erdős number is 2.[3]

Brenner participated in the implementation of APL\360 and APL\1130,[4] and implemented the transpose and rotate primitive functions.[5]

More recently, Brenner specializes in the use of mathematics in DNA analysis.[6] His principal areas of interest and achievement in the mathematics of forensic DNA are kinship, rare haplotype matching, and DNA mixtures. In a couple of Y haplotype papers, most recently,[7] he showed why Y haplotypes must be much rarer, and how much rarer, than their sample frequency in a reference population sample. Brenner’s Symbolic Kinship Program,[8] which can for example assess the identification evidence based on DNA profiles from an anonymous body and an arbitrary set of presumed relatives, has been widely used in mass victim identification projects, including identifying about 1/3 of the identified World Trade Center bodies.[9][10]

Brenner played a key role in the resolution of the Larry Hillblom inheritance case, resulting in four Amerasian children each receiving $50 million.[11]

Anecdotes

References

  1. 1 2 Brenner, Charles Hallam (1984). Asymptotics of Partition Functions (Ph.D. thesis). UCLA.
  2. Brenner, C.H. (November 1986). "Asymptotic Analogs of the Rogers-Ramanujan Identities in Number Theory". Journal of Combinatorial Theory, Series A. 43 (2). Retrieved 3 April 2016.
  3. AMS Erdős number calculator http://www.ams.org/mathscinet/collaborationDistance.html
  4. Breed, Larry (August 2006). "How We Got To APL\1130". Vector, Journal of the British APL Association. 22 (3). Retrieved 3 April 2016.
  5. McDonnell, E.E. (September 2000). "DNA Analysis in APL". Vector, Journal of the British APL Association. 17 (3). Retrieved 3 April 2016.
  6. 1 2 Dreifus, Claudia (8 August 2000). "A Math Sleuth Whose Secret Weapon Is Statistics". New York Times. Retrieved 3 April 2016.
  7. Brenner, C.H. (January 2014). "Understanding Y Haplotype Matching Probability" (PDF). Forensic Science International: Genetics. 8. Retrieved 3 April 2016.
  8. Brenner, C.H. (February 1997). "Symbolic Kinship Program" (PDF). Genetics. 145. Retrieved 3 April 2016.
  9. Smith, Matt (6 March 2002). "Truth Over Death". SF Weekly. Retrieved 6 April 2016.
  10. Whitfield, John (23 April 2003). "World Trade Centre Forensics Break New Ground". Nature. Retrieved 3 April 2016.
  11. Smith, Matt (5 April 2000). "Ca$h for Genes". SF Weekly. Retrieved 5 April 2016.
  12. Brenner, C.H., Bridge Player 1968-1973 London, retrieved 6 April 2016
  13. Hui, Roger (ed.), APL Quotations and Anecdotes, retrieved 5 April 2016
  14. Brenner, C.H. (3 February 1999), The Realm of Mathematics, retrieved 6 April 2016
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