Symplectic and K\"ahler structures on CP1-bundles over CP2
Abstract
We show that there exist symplectic structures on a CP1-bundle over CP2 that do not admit a compatible K\"ahler structure. These symplectic structures were originally constructed by Tolman and they have a Hamiltonian T2-symmetry. Tolman's manifold was shown to be diffeomorphic to a CP1-bundle over CP2 by Goertsches, Konstantis, and Zoller. The proof of our result relies on Mori theory, and on classical facts about holomorphic vector bundles over CP2.
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