Gromov-Witten/Hurwitz wall-crossing

Abstract

For a target variety X and a nodal curve C, we introduce a one-parameter stability condition, termed ε-admissibility, for maps from nodal curves to X× C. If X is a point, ε-admissibility interpolates between moduli spaces of stable maps to C relative to some fixed points and moduli spaces of admissible covers with arbitrary ramifications over the same fixed points and simple ramifications elsewhere on C. Using Zhou's entangled tails, we prove wall-crossing formulas relating invariants for different values of ε. If X is a surface, we use this wall-crossing in conjunction with author's quasimap wall-crossing to show that the relative Pandharipande-Thomas/Gromov-Witten correspondence of X× C and Ruan's extended crepant resolution conjecture of the pair X[n] and [X(n)] are equivalent up to explicit wall-crossings. We thereby prove the crepant resolution conjecture for 3-point genus-0 invariants in all classes, if X is a toric del Pezzo surface.