Non-orientable Lagrangian surfaces in rational 4-manifolds
Abstract
We show that for any nonzero class A in H2(X; Z2) in a rational 4-manifold X, A is represented by a nonorientable embedded Lagrangian surface L (for some symplectic structure) if and only if P(A) (L) (mod\ 4); where P(A) denotes the mod 4 valued Pontrjagin square of A.
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