On the dynamics characterization of complex projective spaces
Abstract
We show that a closed weakly-monotone symplectic manifold of dimension 2n which has minimal Chern number greater than or equal to n+1 and admits a Hamiltonian toric pseudo-rotation is necessarily monotone and its quantum homology is isomorphic to that of the complex projective space. As a consequence when n=2, the manifold is symplectomorphic to CP2.
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