Todd genus and Ak-genus of unitary S1-manifolds

Abstract

Assume that M is a compact connected unitary 2n-dimensional manifold and admits a non-trivial circle action preserving the given complex structure. If the first Chern class of M equals to k0x for a certain 2nd integral cohomology class x with |k0|≥ n + 2, and its first integral cohomology group is zero, this short paper shows that the Todd genus and Ak-genus of M vanish.