馬場 清 | Department Of Mathematics Faculty Of Education And Welfare Science Oita University
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概要
関連著者
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馬場 清
Department Of Mathematics Faculty Of Education And Welfare Science Oita University
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吉田 憲一
Department Of Applied Mathematics Okayama University Of Science
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馬場 清
Department of Mathematics, Faculty of Education and Welfare Science Oita University
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Baba Kiyoshi
Department Of Math. Faculty Of Education And Welfare Science
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吉田 憲一
Department of Applied Math, Okayama University of Science
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吉田 憲一
Department Of Applied Mathematics Faculty Of Science Okayama University Of Science
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吉田 憲一/馬場
Department Of Applied Mathematics Okayama University Of Science/department Of Mathematics Faculty Of
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吉田 憲一
岡山理科大学
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金光 三男
Department of Mathematics, Aichi University of Education
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金光 三男
愛知教育大学数学講座
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吉田 憲一/馬場
Department Of Applied Mathematics Okayama University Of Science/department Of Mathematics Faculty Of
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金光 三男
中部大学現代教育学部
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BABA KIYOSHI
Department of Pediatrics, Kurashiki Central Hospital
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佐藤 淳郎
Department of Mathematics Faculty of Education Kochi University
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Baba Kiyoshi
Department Of Mathematics Faculty Of Education And Welfare Science Oita University
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金光 三男
愛知教育大学
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金光 三男
愛知教育大学数学教育講座
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吉田 憲一/佐藤
Department Of Applied Mathematics Okayama University Of Science/department Of Mathematics Faculty Of
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BABA KIYOSHI
Department of Mathematics, Faculty of Education and Welfare Science, Oita University
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馬場 清
Department of Mathematics Faculty of Education and Welfare Science, Oita University
著作論文
- A note on a condition for the obstruction ideal of an element α to be equal to the obstruction ideal of a linear fractional transform of α
- Flatness and some other properties of a finitely generated extension of anti-integral elements over a Noetherian domain
- A note on some conditions on integrality of the intersection of two simple ring extensions
- Linear Fractional Transforms of an Anti-integral Element over a Noetherian Domain
- Ideals generated by α-a and ideals generated by aα-1 of a Laurent extension R[α,α^-1] of a Noetherian domain
- Extensions R[α] and R[α^2]of a Noetherian domain R
- The Picard group of a finitely generated and birational extension of a Noetherian domain
- Wronskian formula on higher derivations III
- Picard groups and relative invariants II
- Wronskian formula on higher derivations II
- The divisor class group of the ring of invariants associated with μ_q-actions
- Wronskian formula on higher derivations VI
- Wronskian formula on higher derivations V
- Picard groups and relative invariants I
- Relative invariants and divisor class groups II
- Relative invariants and divisor class group I
- Relative Invariants and Divisor Class Groups(1)
- 指数3の拡大k(x,y)/Kのモデュラ-性〔英文〕
- Modularity on Extensions k(x,y)/K of Exponent Two and Subrings of k[x,y]
- One Dimensional Subrings of Constants of a Polynomial Ring
- Higher Derivations and Endomorphism Rings-2-
- Higher Derivations and Endomorphism Rings-1-
- Radical Descent on Picard Groups-1-
- Examples of Krull Domains in Galois Descent Theory-3-
- Examples of Krull Domains in Galois Descent Theory-2-
- An Example of the Non-Noetherian Invariant Subring of a Noetherian Domain
- Ramification in Integral Extensions
- Separability and Pseudo-reflections of Intermediate Integral Domains
- Examples of Krull Domains in Galois Descent Theory-1-
- Galois Descent Technique for Computing Divisor Class groups-2-
- The Divisor Class Groups of Invariant Subrings of a Krull Domain