Equivariant Chern numbers and the number of fixed points for unitary torus manifolds
Abstract
Let M2n be a unitary torus (2n)-manifold, i.e., a (2n)-dimensional oriented stable complex connected closed Tn-manifold having a nonempty fixed set. In this paper we show that M bounds equivariantly if and only if the equivariant Chern numbers < (c1Tn)i(c2Tn)j, [M]>=0 for all i, j∈ N, where clTn denotes the lth equivariant Chern class of M. As a consequence, we also show that if M does not bound equivariantly then the number of fixed points is at least n2+1.
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