Gromov--Witten/Pandharipande--Thomas correspondence via conifold transitions

Abstract

Given a (projective) conifold transition of smooth projective threefolds from X to Y, we show that if the Gromov--Witten/Pandharipande--Thomas descendent correspondence holds for the resolution Y, then it also holds for the smoothing X with stationary descendent insertions. As applications, we show the correspondence in new cases.

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