Universal Lex Ideal Approximations of Extended Hilbert Functions and Hamilton Numbers

Abstract

Let Rh denote the polynomial ring in variables x1,\,…,\, xh over a specified field K. We consider all of these rings simultaneously, and in each use lexicographic (lex) monomial order with x1 > ·s > xh. Given a fixed homogeneous ideal I in Rh, for each d there is unique lex ideal generated in degree at most d whose Hilbert function agrees with the Hilbert function of I up to degree d. When we consider IRN for N ≥ h, the set Bd(I,N) of minimal generators for this lex ideal in degree at most d may change, but Bd(I,N) is constant for all N 0. We let Bd(I) denote the set of generators one obtains for all N 0, and we let bd = bd(I) be its cardinality. The sequences b1, \, …, \, bd, \, … obtained in this way may grow very fast. Remarkably, even when I = (x12, x22), one obtains a very interesting sequence, 0, 2, 3, 4, 6, 12, 924, 409620,\,…. This sequence is the same as Hd-1 + 1 for d ≥ 2, where Hd is the d\,th Hamilton number. The Hamilton numbers were studied by Hamilton and by Hammond and Sylvester because of their occurrence in a counting problem connected with the use of Tschirnhaus transformations in manipulating polynomial equations.