Gromov--Witten Theory of CP1 and Integrable Hierarchies
Abstract
The ancestor Gromov--Witten invariants of a compact manifold X can be organized in a generating function called the total ancestor potential of X. In this paper, we construct Hirota Quadratic Equations (HQE shortly) for the total ancestor potential of P1. The idea is to adopt the formalism developed in G1,GM to the mirror model of P1. We hope that the ideas presented here can be generalized to other manifolds as well. As a corollary, using the twisted loop group formalism from G3, we obtain a new proof of the following version of the Toda conjecture: the total descendant potential of P1 (known also as the partition function of the P1 topological sigma model) is a tau-function of the Extended Toda Hierarchy.
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