Intersection Numbers on the Moduli Spaces of Stable Maps in Genus 0

Abstract

Let V be a smooth, projective, convex variety. We define tautological and classes on the moduli space of stable maps 0,n(V), give a (graphical) presentation for these classes in terms of boundary strata, derive differential equations for the generating functions of the Gromov-Witten invariants of V twisted by these tautological classes, and prove that these intersection numbers are completely determined by the Gromov-Witten invariants of V. This results in families of Frobenius manifold structures on the cohomology ring of V which includes the quantum cohomology as a special case.

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