260310 Hessel Posthuma

The Atiyah-SInger index theorem gives a topological formula for the index of Dirac operators on compact manifolds, building a bridge between analysis and topology. The fundamental idea behind higher index theory is that in the presence of symmetries, an even more richer connection becomes visible. In this talk I’ll give an introduction to a higher index theorem of this type, given by a fixed point formula for a proper action of a discrete group. This is based on joint work with Paolo Piazza, Yanli Song and Xiang Tang.