Some 6-dimensional Hamiltonian S-1-manifolds

摘要

In an earlier paper we explained how to convert the problem of symplectically embedding one 4-dimensional ellipsoid into another into the problem of embedding a certain set of disjoint balls into Cp-2 by using a new way to desingularize orbifold blow-ups Z of the weighted projective space Cp-1,m,n(2). We now use a related method to construct symplectomorphisms of these spaces Z. This allows us to construct some well-known Fano 3-folds (including the Mukai-Umemura 3-fold) in purely symplectic terms using a classification by Tolman of a particular class of Hamiltonian S-1-manifolds. We also show that (modulo scaling) these manifolds are uniquely determined by their fixed-point data up to equivariant symplectomorphism. As part of this argument, we show that the symplectomorphism group of a certain weighted blow-up of a weighted projective plane is connected.