Gromov-Witten invariants of P1 coupled to a KdV tau function
Abstract
We consider the pull-back of a natural sequence of cohomology classes g,n∈ H2(2g-2+n)( Mg,n) to the moduli space of stable maps Mgn(P1,d). These classes are related to the Br\'ezin-Gross-Witten tau function of the KdV hierarchy via ZBGW(,t0,t1,...)=Σ2g-2n!∫ Mg,ng,n·Πj=1njkjΠ tkj. Insertions of the pull-backs of the classes g,n into the integrals defining Gromov-Witten invariants define new invariants which we show in the case of target P1 are given by a random matrix integral and satisfy the Toda equation.
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