| David Harbater | |
| Birth Date: | 19 December 1952 |
| Birth Place: | New York City, New York, US |
| Fields: | Mathematics |
| Workplaces: | University of Pennsylvania |
| Alma Mater: | Harvard University (BA) Brandeis University (MA) MIT(PhD) |
| Doctoral Advisor: | Michael Artin |
| Doctoral Students: | Sybilla Beckmann Rachel Pries |
| Known For: | Proof of Abhyankar's conjecture |
| Awards: | Cole Prize (1995) |
David Harbater (born December 19, 1952) is an American mathematician at the University of Pennsylvania, well known for his work in Galois theory, algebraic geometry and arithmetic geometry.
Harbater was born in New York City and attended Stuyvesant High School, where he was on the math team. After graduating in 1970, he entered Harvard University.
After graduating summa cum laude in 1974, Harbater earned a master's degree from Brandeis University and then a Ph.D. in 1978 from MIT, where he wrote a dissertation (Deformation Theory and the Fundamental Group in Algebraic Geometry) under the direction of Michael Artin.
He solved the inverse Galois problem over
Qp(t)
Harbater's recent work on patching over fields, together with Julia Hartmann and Daniel Krashen, has had applications in such varied fields as quadratic forms, central simple algebras and local-global principles.
In 1995, Harbater was awarded the Cole Prize for his solution, with Michel Raynaud, of the long outstanding Abhyankar conjecture.
In 2012, he became a fellow of the American Mathematical Society.[1]