A Desingularization of the Main Component of the Moduli Space of Genus-One Stable Maps into Pn
Abstract
We construct a desingularization of the ``main component'' M1,k0(Pn,d) of the moduli space M1,k(Pn,d) of genus-one stable maps into the complex projective space Pn. As a bonus, we obtain desingularizations of certain natural sheaves over M1,k0(Pn,d). Such desingularizations are useful for integrating natural cohomology classes on M1,k0(Pn,d) using localization. In turn, these classes can be used to compute the genus-one Gromov-Witten invariants of complete intersections and classical enumerative invariants of projective spaces involving genus-one curves. The desingularization of M1,k0(Pn,d) is obtained by sequentially blowing up M1,k(Pn,d) along ``bad'' subvarieties. At the end of the process, we are left with a modification of the main component, which turns out to be nonsingular.
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