Hamiltonian circle action, invariant hypersurface and the complex projective space

Abstract

Let M be a 2n-dimensional closed symplectic manifold admitting a Hamiltonian circle action with isolated fixed points. We show that if M contains an S1-invariant symplectic hypersurface D such that M D is a homology cell, which is satisfied when M D is contractible, then M and D are homotopy complex projective spaces with standard Chern classes and the S1-representations on the fixed-point set of (M,D) are the same as those arising from the standard linear actions on (Pn,Pn-1), provided that n 3 4. This can be viewed as the transformation group analogue to a recent result obtained by Peternell and the author, where the latter was conjectured by Fujita more than four decades ago.

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