Analytic Methods for Diophantine Equations
May 13, 2006
to
May 18, 2006
Organizer(s)Michael Bennett, Chantal David, William Duke, Andrew Granville (co-chair),Yuri Tschinkel (co-chair)
ContactThis workshop brings together the participants of the program, Rational and Integer Points on Higher Dimensional Varieties at MSRI and the program, Analysis in Number Theory at CRM, Montreal. It will be held at the Banff International Research Station, and will include expository talks as well as presentations on current research highlighting the flow of ideas between analytic number theory and arithmetic geometry.
Parent Program(s):On the analytic side, one has the circle method and its modern adaptations, sieving methods, techniques from spectral theory, ergodic theory and the theory of automorphic forms. On the side of arithmetic geometry, there is the theory of universal torsors, heights, intersection theory, $p$-adic integration, theory of moduli spaces, compactifications of algebraic groups and homogeneous spaces. Open problems range from understanding very concrete equations to more abstract questions of proving and interpreting asymptotics of rational and integral points on orbits of linear algebraic groups, special points on semi-abelian varieties and Shimura varieties. Among the themes to be discussed are:
Rational and Integral Points on Higher-Dimensional Varieties
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