Coefficients of normal hilbert polynomials

Communicated by D. A. Buchsbaum

In this paper, we obtain an exact formula for the average density of the distribution of complex zeros of a random trigonometric polynomial , where the coefficients η j = a j + ιb j , and a j n j=1 and b j n j=1 are sequences of independent normally distributed random variables with mean 0 and vari

Let x = Cxijll $i<m be an m x n of matrix of indeterminates over a field K. Abhyankar IGj<n defines the index of a monomial in Xij to be the largest k such that the principal diagonal of some k x k minor of X divides the given monomial. Abhyankar has given a formula for counting the set of monomials

Let R be a ring of polynomials in m + n indeterminates x 1 , . . . , xm, y 1 , . . . , yn over a field K and let M be a finitely generated R-module. Furthermore, let (Rrs) r,s∈N be the natural double filtration of the ring R and let (Mrs) r,s∈N be the corresponding double filtration of the module M