On the arithmetic Hilbert depth

Abstract

Let h: Z Z≥ 0 be a nonzero function with h(k)=0 for k 0. We define the Hilbert depth of h by hdepth(h)=\d\;:\; Σj≤ k (-1)k-jd-jk-jh(j)≥ 0 for all k≤ d\. We show that hdepth(h) is a natural generalization for the Hilbert depth of a subposet P⊂ 2[n] and we prove some basic properties of it. Given h(j)=cases ajn+b,& j≥ 0 \\ 0, & j<0 cases, with a,b,n positive integers, we compute hdepth(h) for n=1,2 and we give upper bounds for hdepth(h) for n≥ 3. More generally, if h(j)=cases P(j),& j≥ 0 \\ 0,& j<0 cases, where P(j) is a polynomial of degree n, with non-negative integer coefficients, and P(0)>0, we show that hdepth(h)≤ 2n+1.