Hirota Quadratic Equations for the Gromov–Witten Invariants of $mathbb{P}_{n-2,2,2}^1$

Kavli Affiliate: Todor Milanov | First 5 Authors: Jipeng Cheng, Todor Milanov, , , | Summary: Fano orbifold lines are classified by the Dynkin diagrams of type $A,D,$ and $E$. It is known that the corresponding total descendant potential is a tau-function of an appropriate Kac–Wakimoto hierarchy. It is also known that in the A-case […]


Continue.. Hirota Quadratic Equations for the Gromov–Witten Invariants of $mathbb{P}_{n-2,2,2}^1$