8th  Top University of Texas at Austin faculty 
30th  Top people by Erd%C5%91s number: #3 
John Torrence Tate Jr., born March 13, 1925, in Minneapolis, Minnesota, is an American mathematician, distinguished for many fundamental contributions in algebraic number theory and related areas in algebraic geometry. He wrote a Ph.D. at Princeton in 1950 as a student of Emil Artin, was at Harvard University 1954–1990, and is now at the University of Texas at Austin.
Tate's thesis, on the analytic properties of the class of Lfunctions introduced by Erich Hecke, is one of the relatively few such dissertations that have become a byword. In it the methods, novel for that time, of Fourier analysis on groups of adeles, were worked out to recover Hecke's results.
Subsequently Tate worked with Emil Artin to give a treatment of class field theory based on cohomology of groups, explaining the content as the Galois cohomology of idele classes, and introduced Tate cohomology groups. In the following decades Tate extended the reach of Galois cohomology: Poitou–Tate duality, abelian varieties, the Tate–Shafarevich group, and relations with algebraic Ktheory.
He made a number of individual and important contributions to padic theory: the Lubin–Tate local theory of complex multiplication of formal groups; rigid analytic spaces; the 'Tate curve' parametrisation for certain padic elliptic curves; pdivisible (Tate–Barsotti) groups. Many of his results were not immediately published and were written up by JeanPierre Serre. They collaborated on a major published paper on good reduction of abelian varieties.
The Tate conjectures are the equivalent for étale cohomology of the Hodge conjecture. They relate to the Galois action on the ladic cohomology of an algebraic variety, identifying a space of 'Tate cycles' (the fixed cycles for a suitably Tatetwisted action) that conjecturally picks out the algebraic cycles. A special case of the conjectures, which are open in the general case, was involved in the proof of the Mordell conjecture by Gerd Faltings.
Tate has had a profound influence on the development of number theory through his role as a PhD advisor. His students include Joe Buhler, Benedict Gross, Robert Kottwitz, James Milne, Carl Pomerance, Ken Ribet, Joseph H. Silverman, Dinesh Thakur, and Jeremy Teitelbaum.
He was awarded a Wolf Prize in Mathematics in 2002/3.

