On the Genus-One Gromov-Witten Invariants of Complete Intersections

Abstract

As shown in a previous paper, certain naturally arising cones of holomorphic vector bundle sections over the main component 1,k0(,d) of the moduli space of stable genus-one holomorphic maps into have a well-defined euler class. In this paper, we extend this result to moduli spaces of perturbed, in a restricted way, J-holomorphic maps. We show that euler classes of such cones relate the reduced genus-one Gromov-Witten invariants of complete intersections to the corresponding GW-invariants of the ambient projective space. As a consequence, the standard genus-one GW-invariants of complete intersections can be expressed in terms of the genus-zero and genus-one GW-invariants of projective spaces. We state such a relationship explicitly for complete-intersection threefolds. A relationship for higher-genus invariants is conjectured as well.

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