Chow Rings of Mp0,2(N,d) and Mbar0,2(PN-1,d) and Gromov-Witten Invariants of Projective Hypersurfaces of Degree 1 and 2

Abstract

In this paper, we prove formulas that represent two-pointed Gromov-Witten invariant <OhaOhb>0,d of projective hypersurfaces with d=1,2 in terms of Chow ring of Mbar0,2(PN-1,d), the moduli spaces of stable maps from genus 0 stable curves to projective space PN-1. Our formulas are based on representation of the intersection number w(OhaOhb)0,d, which was introduced by Jinzenji, in terms of Chow ring of Mp0,2(N,d), the moduli space of quasi maps from P1 to PN-1 with two marked points. In order to prove our formulas, we use the results on Chow ring of Mbar0,2(PN-1,d), that were derived by A. Mustata and M. Mustata. We also present explicit toric data of Mp0,2(N,d) and prove relations of Chow ring of Mp0,2(N,d).