Thomas Callister Hales
Thomas Hales | |
---|---|
Born |
San Antonio, Texas | June 4, 1958
Residence | United States |
Nationality | American |
Fields | Mathematics |
Institutions |
University of Pittsburgh University of Michigan |
Alma mater | Princeton University |
Doctoral advisor | Robert Langlands |
Known for | Proving Kepler conjecture |
Notable awards |
Chauvenet Prize(2003) David P. Robbins Prize(2007) Fulkerson Prize(2009) |
Thomas Callister Hales (born June 4, 1958) is an American mathematician working on the Langlands program. He is known in the area for having worked on the fundamental lemma, and proving a special case of it over the group Sp(4). Many of his ideas were incorporated into the final proof, due to Ngô Bảo Châu. He is also known for his 1998 computer-aided proof of the Kepler conjecture, a centuries-old problem in discrete geometry which states that the most space-efficient way to pack spheres is in a pyramid shape. Hales also proved the honeycomb conjecture.
Education
He received his Ph.D. from Princeton University in 1986.
Career in mathematics
Hales, formerly at the University of Michigan, and now University of Pittsburgh Mellon Professor of mathematics, advocates the formalization of mathematics to ensure rigor in an era where proofs are becoming increasingly complex and computers are becoming necessary to perform verification. Hales's current project, called Flyspeck, seeks to formalize his proof of the Kepler conjecture in the computer theorem prover HOL Light. [1] [2] [3]
Hales won the Chauvenet Prize in 2003[4] and a Lester R. Ford Award in 2008.[5] In 2012 he became a fellow of the American Mathematical Society.[6]
Notes
- ↑ Hales's page at the University of Pittsburgh Math Department
- ↑ Flyspeck Project
- ↑ Hales solves oldest problem in discrete geometry The University Record (University of Michigan), September 16, 1998
- ↑ Hales, Thomas C. (2000). "Cannonballs and Honeycombs". Notices of the AMS 47 (4): 440–449.
- ↑ Hales, Thomas C. (2007). "The Jordan Curve Theorem, Formally and Informally". Amer. Math. Monthly 114: 882–894.
- ↑ List of Fellows of the American Mathematical Society, retrieved 2013-01-19.
External links
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