A local index theorem for CR manifolds with $S^1$ action
Among those transversally elliptic operators initiated by Atiyah and Singer, Kohn's $\Box_b$ operator on CR manifolds with $S^1$ action is a natural one of geometric significance for complex analysts. Our main result computes a local index density, in terms of \emph{tangential} characteristic forms, on such manifolds including \emph{Sasakian manifolds} of interest in String Theory. As applications of our CR index theorem we can prove a CR version of Grauert-Riemenschneider criterion, and produce many CR functions on a weakly pseudoconvex CR manifold with transversal $S^1$ action and many CR sections on some class of CR manifolds, answering some long-standing questions raised by Kohn and Henkin respectively. Moreover in some cases, we can reinterpret Kawasaki's Hirzebruch-Riemann-Roch formula for a complex orbifold with an orbifold holomorphic line bundle as an index theorem obtained by an integral over a smooth CR manifold which is essentially the circle bundle of this line bundle. This is joint work with Chin-Yu Hsiao and I-Hsun Tsai http://cvgmt.sns.it/seminar/528/
When
Tue May 10, 2016 1pm – 2pm Coordinated Universal Time
