The Laurent coefficients of the Hilbert series of a Gorenstein algebra

Abstract

By a theorem of R. Stanley, a graded Cohen-Macaulay domain A is Gorenstein if and only if its Hilbert series satisfies the functional equation \[ HilbA(t-1)=(-1)d t-aHilbA(t), \] where d is the Krull dimension and a is the a-invariant of A. We reformulate this functional equation in terms of an infinite system of linear constraints on the Laurent coefficients of HilbA(t) at t=1. The main idea consists of examining the graded algebra F=r∈ Z Fr of formal power series in the variable x that fulfill the condition (x/(x-1))=(1-x)r(x). As a byproduct, we derive quadratic and cubic relations for the Bernoulli numbers. The cubic relations have a natural interpretation in terms of coefficients of the Euler polynomials. For the special case of degree r=-(a+d)=0, these results have been investigated previously by the authors and involved merely even Euler polynomials. A link to the work of H. W. Gould and L. Carlitz on power sums of symmetric number triangles is established.