On 7-semigroups of genus 9 generated by 5 elements
スポンサーリンク
概要
- 論文の詳細を見る
数学
- 神奈川工科大学の論文
- 2006-03-20
著者
関連論文
- The Parents and the Children of Non-Weierstrass semigroups (Algebras, Languages, Algorithms in Algebraic Systems and Computations)
- Numerical semigroups of double covering type and Hurwitz's problem (Algebras, Languages, Algorithms and Computations)
- Weierstrass points on a non-singular plane curve of degree 7
- The numerical semigroup of toric type at a ramification point on a double covering of a curve
- A generalization of Weierstrass semigroups on a double covering of a curve (Languages, Computations, and Algorithms in Algebraic Systems)
- A numerical semigroup from which the semigroup gained by dividing by two is either N0 or a 2-semigroup or 〈3,4,5〉
- The dimension of a toric variety obtained from a numerical semigroup (Algorithmic and Computational Theory in Algebra and Languages)
- Two dimensional affine toric varieties and Weierstrass semigroups
- On primitive numerical semigroups of genus 10(Algebras, Languages, Computations and their Applications)
- On Numerical Semigroups of Genus 9(Algorithmic problems in algebra, languages and computation systems)
- On 7-semigroups of genus 9 generated by 5 elements
- On Weierstrass 7-semigroups (Algebra, Languages and Computation)
- On 7-semigroups Generated by 4 Elements
- A generalization of a non-symmetric numerical semigroup generated by three elements (Algebraic Systems, Formal Languages and Conventional and Unconventional Computation Theory)
- On 6-semigroups generated by 4 elements from which affine toric varieties can be constructed
- A generalization of a non-symmetric numerical semigroup generated by three elements
- Numerical semigroups of toric type of higher dimension (Algorithms in Algebraic Systems and Computation Theory)
- Remarks on Weierstrass pairs of ramification points on a bielliptic curve
- Weierstrass semigroups of a pair of points whose first non-gaps are three (Algebraic Semigroups, Formal Languages and Computation)
- Remarks on Weierstrass semigroups of a Pair of Points Whose First Non-gaps Are Three
- The Weierstrass semigroup of a pair and moduli in $\mathcal{M}_3$ (Algebraic Systems, Formal Languages and Computations)
- On the Weight of a Primitive Numerical Semigroup
- On indices of primitive n-semigroups with an even number n
- The fractional map by two and the parent map of numerical semigroups (Algebraic Systems and Theoretical Computer Science)