On the h-polynomials of cyclotomic standard graded commutative algebras

Abstract

We call a standard graded commutative -algebra cyclotomic if its h-polynomial has all its roots on the unit circle in the complex plane. Complete intersections provide typical examples of cyclotomic algebras, since the h-polynomial of any standard graded complete intersection is a product of polynomials of the form 1 + t + ·s + tm-1. We refer to such polynomials as being of type CI. A natural question is whether there exists a cyclotomic standard graded -algebra whose h-polynomial is not of type CI. In this paper, we give a partial answer to this question. We show that the h-polynomial hR(t) of a cyclotomic standard graded -algebra R is of type CI whenever hR(1) ∈ \1, 4, 6\ or hR(1) is prime. On the other hand, if n 8 and n is not prime, then there exists a cyclotomic standard graded -algebra R whose h-polynomial hR(t) is not of type CI and satisfies hR(1) = n.

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