The Veronese Construction for Formal Power Series and Graded Algebras

Abstract

Let (an)n ≥ 0 be a sequence of complex numbers such that its generating series satisfies Σn ≥ 0 antn = h(t)(1-t)d for some polynomial h(t). For any r ≥ 1 we study the transformation of the coefficient series of h(t) to that of h< r >(t) where Σn ≥ 0 anr tn = h< r >(t)(1-t)d. We give a precise description of this transformation and show that under some natural mild hypotheses the roots of h< r >(t) converge when r goes to infinity. In particular, this holds if Σn ≥ 0 an tn is the Hilbert series of a standard graded k-algebra A. If in addition A is Cohen-Macaulay then the coefficients of h< r >(t) are monotonely increasing with r. If A is the Stanley-Reisner ring of a simplicial complex then this relates to the rth edgewise subdivision of which in turn allows some corollaries on the behavior of the respective f-vectors.