Cameron Gordon (born 1945) is a Professor and Sid W. Richardson Foundation Regents Chair[1] in the Department of Mathematics at the University of Texas at Austin, known for his work in knot theory. Among his notable results is his work with Marc Culler, John Luecke, and Peter Shalen on the cyclic surgery theorem. This was an important ingredient in his work with Luecke showing that knots were determined by their complement. Gordon was also involved in the resolution of the Smith conjecture.
Andrew Casson and Gordon defined and proved basic theorems regarding strongly irreducible Heegaard splittings, an important concept in the modernization of Heegaard splitting theory. They also worked on the slice-ribbon conjecture, inventing the Casson-Gordon invariants in the process.
Gordon was a 1999 Guggenheim Fellow.[2] In 2005 Gordon was elected a Corresponding Fellow of the Royal Society of Edinburgh.[3] In 2023 Gordon was elected to the National Academy of Sciences.[4]
References
edit- ^ Mathematics Faculty Archived 2010-01-24 at the Wayback Machine, Department of Mathematics, University of Texas at Austin. Accessed January 22, 2010.
- ^ Guggenheim Fellowships Awarded. Notices of the American Mathematical Society, vol. 46 (1999), no. 6, p. 685
- ^ RSE fellows. Times Higher Education, March 18, 2005. Accessed January 22, 2010.
- ^ "2023 NAS Election". www.nasonline.org. Retrieved 2024-04-05.
External links
edit- Cameron Gordon's personal webpage, University of Texas at Austin
- Cameron McAllan Gordon, Mathematics Genealogy Project