Graded algebras with prescribed Hilbert series

Abstract

For any power series a(t) with exponentially bounded nonnegative integer coefficients we suggest a simple construction of a finitely generated monomial associative algebra R with Hilbert series H(R,t) very close to a(t). If a(t) is rational/algebraic/transcendental, then the same is H(R,t). If the growth of the coefficients of a(t) is polynomial, in the same way we construct a graded algebra R preserving the polynomial growth of the coefficients of its Hilbert series H(R,t). Applying a classical result of Fatou from 1906 we obtain that if a finitely generated graded algebra R has a finite Gelfand-Kirillov dimension, then its Hilbert series is either rational or transcendental. In particular the same dichotomy holds for the Hilbert series of finitely generated algebras R with polynomial identity.