Hirzebruch Functional Equation: Classification of Solutions

Abstract

The Hirzebruch functional equation is \[ Σi = 1n Πj i 1 f(zj - zi) = c \] with constant c and initial conditions f(0)=0, f'(0)=1. In this paper we find all solutions of the Hirzebruch functional equation for n ≤slant 6 in the class of meromorphic functions and in the class of series. Previously, such results were known only for n ≤slant 4. The Todd function is the function determining the two-parametric Todd genus (i.e. the a,b-genus). It gives a solution to the Hirzebruch functional equation for any n. The elliptic function of level N is the function determining the elliptic genus of level N. It gives a solution to the Hirzebruch functional equation for n divisible by N. A series corresponding to a meromorphic function f with parameters in U ⊂ Ck is a series with parameters in the Zariski closure of U in Ck, such that for parameters in U it coincides with the series expansion at zero of f. The main results are: Any series solution of the Hirzebruch functional equation for n = 5 corresponds to the Todd function or to the elliptic function of level 5. Any series solution of the Hirzebruch functional equation for n = 6 corresponds to the Todd function or to the elliptic function of level 2, 3 or 6. This gives a complete classification of complex genera that are fiber multiplicative with respect to CPn-1 for n ≤slant 6.