On the kappa ring of Mg,n

Abstract

Let e(Mg,n) denote the kappa ring of Mg,n in codimension e. For g,e≥ 0 fixed, as the number n of the markings grows large we show that the rank of e(Mg,n) is asymptotic to n+e eg+e e(e+1)! g+e enee!(e+1)!. When g≤ 2 we show that a kappa class is trivial if and only if the integral of against all boundary strata is trivial. For g=1 we further show that the rank of n-d(M1,n) is equal to |P1(d,n-d)|, where Pi(d,k) denotes the set of partitions p=(p1,...,p) of d such that at most k of the numbers p1,...,p are greater than i.