Kaehler structures on Hamiltonian S^1-manifolds.

By a theorem of Karshon any compact four-dimensional symplectic manifold with a Hamiltonian $S^1$ action has a compatible $S^1$-invariant Kaehler structure. Taking a product of $S^2$ with a non-Kaehler symplectic 4-manifold one immediately constructs a counter-example to such a statement in dimension 6. However, in case one imposes the condition on the action to have only isolated fixed points, such a counter-example was unknown. In a joint work with Nick Lindsay I prove the existence of such a 6-dimensional example with $b_2=2$. This is a minimal such example, since by the work of Tolman and McDuff in the case $b_2=1$ the symplectic 6-manifold has a compatible Kaehler structure.