S1-fixed-points in hyper-Quot-schemes and an exact mirror formula for flag manifolds from the extended mirror principle diagram
Abstract
In [L-L-Y1, III: Sec. 5.4] on mirror principle, a method was developed to compute the integral ∫XτeH· t 1d for a flag manifold X=r1, ..., rI( Cn) via an extended mirror principle diagram. This method turns the required localization computation on the augmented moduli stack M0,0(1× X) of stable maps to a localization computation on a hyper-Quot-scheme ( En). In this article, the detail of this localization computation on ( En) is carried out. The necessary ingredients in the computation, notably, the S1-fixed-point components and the distinguished ones E(A;0) in ( En), the S1-equivariant Euler class of E(A;0) in ( En), and a push-forward formula of cohomology classes involved in the problem from the total space of a restrictive flag manifold bundle to its base manifold are given. With these, an exact expression of ∫XτeH· t 1d is obtained. Comments on the Hori-Vafa conjecture are given in the end.
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