Throughout the project the team, consisting of the PI and 11 members have obtained results on the topics outlined in the proposal. These results are documented in over 30 mathematical articles, out of which already 25 are published or accepted in established, peer-reviewed international journals and 6 are submitted for publication.
Team members have travelled to conferences and seminars around the world to collaborate and to disseminate the results of the project; invited expert guest to visit the Host Institution, collaborate and present talks on their results; co-organized international workshops at the host institution; given several presentations on the results of the project in popular science media outlets.
The most significant results of the project to date is a series of results showing that Aut(F_n), the automorphism group of the free group on n generators, has Kazhdan's property (T) for n from 5 to infinity. This resolves been a long-standing open problem and has several applications, including some in theoretical computer science. Our methods make use of convex optimization through a recently invented method of establishing property (T) by solving equations in the group ring via semidefinite programming. Other results include new constructions of projections that give rise to interesting classes in K-theory. These classes are used to find counterexamples to certain versions of the Baum-Connes conjecture.