Monomial Gorenstein curves in \(A^4\) as set-theoretic complete intersections
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Publication:1257940
DOI10.1007/BF01507291zbMath0407.14022OpenAlexW2086031196MaRDI QIDQ1257940
Publication date: 1979
Published in: Manuscripta Mathematica (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/154621
Related Items (18)
An example of set-theoretic complete intersection lattice ideal ⋮ Set-theoretic complete intersection monomial curves in affine four space ⋮ On the set-theoretic complete intersection problem for monomial curves in \(\mathbb{A}^ n\) and \(\mathbb{P}^ n\) ⋮ Almost Gorenstein monomial curves in affine four space ⋮ A note on Symmetric Semigroups and almost arithmetic sequences ⋮ Almost complete intersection monomial curves inA4 ⋮ Affine monomial curves ⋮ Set-theoretic complete intersection monomial curves in \({\mathbb{P}^n}\) ⋮ On Ideals Generated by Monomials and One Binomial ⋮ Unnamed Item ⋮ The monomial curves associated with balanced semigroups are set-theoretic complete intersections ⋮ Projections of cones and the arithmetical rank of toric varieties ⋮ Set-theoretic complete intersection lattice ideals in monoid rings ⋮ Certain Minimal Varieties Are Set-Theoretic Complete Intersections ⋮ On toric varieties which are almost set-theoretic complete intersections ⋮ Defining ideals of semigroup rings which are gorenstein ⋮ Certain monomial curves are set-theoretic complete intersections ⋮ Some results about symmetric semigroups
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