Counting embedded curves in symplectic 6-manifolds

Abstract

Based on computations of Pandharipande, Zinger proved that the Gopakumar-Vafa BPS invariants BPSA,g(X,ω) for primitive Calabi-Yau classes and arbitrary Fano classes A on a symplectic 6-manifold (X,ω) agree with the signed count nA,g(X,ω) of embedded J-holomorphic curves representing A and of genus g for a generic almost complex structure J compatible with ω. Zinger's proof of the invariance of nA,g(X,ω) is indirect, as it relies on Gromov-Witten theory. In this article we give a direct proof of the invariance of nA,g(X,ω). Furthermore, we prove that nA,g(X,ω) = 0 for g 1, thus proving the Gopakumar-Vafa finiteness conjecture for primitive Calabi-Yau classes and arbitrary Fano classes.