The Di Francesco-Itzykson-G\"ottsche Conjectures for Node Polynomials of P2

Abstract

For a smooth, irreducible projective surface S over C, the number of r-nodal curves in an ample linear system |L| (where L is a line bundle on S) can be expressed using the rth Bell polynomial Pr in r universal functions ai of (S,L), which are linear polynomials in the four Chern numbers of S and L. We use this result to establish a proof of the classical shape conjectures of Di Francesco-Itzykson and G\"ottsche governing node polynomials in the case of P2. We also give a recursive procedure which provides the L2-term of the polynomials ai.