Enumerative g-theorems for the Veronese construction for formal power series and graded algebras

Abstract

Let (an)n ≥ 0 be a sequence of integers 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 coefficient sequence of the numerator polynomial h0(a<r >) +...+ hλ'(a<r >) tλ' of the rth Veronese series a<r >(t) = Σn ≥ 0 anr tn. Under mild hypothesis we show that the vector of successive differences of this sequence up to the d2 th entry is the f-vector of a simplicial complex for large r. In particular, the sequence satisfies the consequences of the unimodality part of the g-conjecture. We give applications of the main result to Hilbert series of Veronese algebras of standard graded algebras and the f-vectors of edgewise subdivisions of simplicial complexes.