On Vanishing of Gromov--Witten Invariants
Abstract
We consider the decision problem of whether a particular Gromov--Witten invariant on a partial flag variety is zero. We prove that for the 3-pointed, genus zero invariants, this problem is in the complexity class AM assuming the Generalized Riemann Hypothesis (GRH), and therefore lies in the second level of polynomial hierarchy PH. For the proof, we construct an explicit system of polynomial equations through a translation of the defining equations. We also need to prove an extension of the Parametric Hilbert's Nullstellensatz to obtain our central reduction.
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