Higher genus Gromov-Witten invariants from projective bundles on smooth log Calabi-Yau pairs

Abstract

Let (X,E) be a smooth log Calabi-Yau pair consisting of a smooth Fano surface X and a smooth anticanonical divisor E. We obtain certain higher genus local Gromov-Witten invariants from the projectivization of the canonical bundle Z := P(KX OX), using the degeneration formula for stable log maps [KLR]. We evaluate an invariant in the degeneration using the relationship between q-refined tropical curve counting and logarithmic Gromov-Witten theory with λg-insertion [Bou]. As a corollary, we use flops to prove a blow up formula for higher genus invariants of Z. Additionally assuming X is toric, we prove an all-genus correspondence between open invariants of an outer Aganagic-Vafa brane L ⊂ KX and closed invariants of Z that generalizes a genus-0 open-closed equality of [Cha] to all-genus, by using an argument in [GRZZ].

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