Abstract
Let k be a field and m0, …, me−1 (e ≥ 3) be a sequence of positive integers with gcd(m0, …, me−1) = 1. Let \( \mathcal{C} \) be the affine monomial curve in the e-space \( \mathbb{A}_{k}^{e} \) defined parametrically by \({T^{{m_0}}}, \ldots ,{X_{e - 1}} = {T^{{m_{e - 1}}}}\). In this article, we assume that m0, …, me−1 form a minimal arithmetic sequence and find some criterion for complete intersection of C.
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© 2003 Hindustan Book Agency
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Maloo, A.K., Sengupta, I. (2003). Criterion for Complete Intersection of certain Monomial Curves. In: Musili, C. (eds) Advances in Algebra and Geometry. Hindustan Book Agency, Gurgaon. https://doi.org/10.1007/978-93-86279-12-5_14
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DOI: https://doi.org/10.1007/978-93-86279-12-5_14
Publisher Name: Hindustan Book Agency, Gurgaon
Print ISBN: 978-81-85931-36-4
Online ISBN: 978-93-86279-12-5
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