Quantum flips I: local model

Abstract

We study analytic continuations of quantum cohomology under simple flips f: X X' along the extremal ray quantum variable q. The inverse correspondence = [f]* by the graph closure gives an embedding of Chow motives [X'] [X] which preserves the Poincar\'e pairing. We construct a deformation of = [f]* which induces a non-linear embedding QH(X') QH(X) in the category of F-manifolds into the regular integrable loci of QH(X) near q = ∞. This provides examples of functoriality of quantum cohomology beyond K-equivalent transformations. In this paper, we focus on the case when X and X' are (projective) local models.