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Abstract
In this article we investigate when a homogeneous ideal in a graded ring is normal, that is, when all positive powers of the ideal are integrally closed. We are particularly interested in homogeneous ideals in an ℕ-graded ring Aof the form A
≥m
≔ ⊕ℓ≥m
A
ℓand monomial ideals in a polynomial ring over a field. For ideals of the form A
≥m
we generalize a recent result of Faridi. We prove that a monomial ideal in a polynomial ring in nindeterminates over a field is normal if and only if the first n − 1 positive powers of the ideal are integrally closed. We then specialize to the case of ideals of the form I(
λ
) ≔ , where J(
λ
) = (
,…,
) ⊆ K[x
1,…, x
n
]. To state our main result in this setting, we let ℓ = lcm(λ1,…,
,…λ
n
), for 1 ≤ i ≤ n, and set
λ
′ = (λ1,…, λ
i−1, λ
i
+ ℓ, λ
i+1,…, λ
n
). We prove that if I(
λ
′) is normal then I(
λ
) is normal and that the converse holds with a small additional assumption.
Key Words:
