Minimality and symplectic sums
Abstract
Let X1, X2 be symplectic 4-manifolds containing symplectic surfaces F1,F2 of identical positive genus and opposite squares. Let Z denote the symplectic sum of X1 and X2 along the Fk. Using relative Gromov--Witten theory, we determine precisely when the symplectic 4-manifold Z is minimal (i.e., cannot be blown down); in particular, we prove that Z is minimal unless either: one of the Xk contains a (-1)-sphere disjoint from Fk; or one of the Xk admits a ruling with Fk as a section. As special cases, this proves a conjecture of Stipsicz asserting the minimality of fiber sums of Lefschetz fibrations, and implies that the non-spin examples constructed by Gompf in his study of the geography problem are minimal.
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