Fujii Jun | Department Of Art And Sciences (information Science) Osaka Kyoiku University
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概要
- FUJII JUN ICHIの詳細を見る
- 同名の論文著者
- Department Of Art And Sciences (information Science) Osaka Kyoiku Universityの論文著者
関連著者
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Fujii Jun
Department Of Art And Sciences (information Science) Osaka Kyoiku University
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FUJII JUN
DEPARTMENT OF ART AND SCIENCES(INFORMATION SCIENCE), OSAKA KYOIKU UNIVERSITY
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Nakamura Masahiro
Department Of Agronomy Facluty Of Agriculture Tohoku University:(present Address) Miyagi Agricultura
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NAKAMURA Masahiro
Department of Material Chemistry, Kyoto University
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FUJII JUN
DEPARTMENT OF ARTS AND SCIENCES (INFORMATION SCIENCE), OSAKA KYOIKU UNIVERSITY
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Kim Young
Department Of Electronics Engineering Korea Advance Intitute Of Science & Technology
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Kim Young
Department Of Mathematics Suwon University
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Kim Young
Department Of Agricultural Chemistry The University Of Tokyo
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Fujii Masatoshi
Department Of Chemistry Graduate School Of Science Tokyo Metropolitan University
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SEO YUKI
FACULTY OF ENGINEERING, SHIBAURA INSTITUTE OF TECHNOLOGY
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Fujii Jun
Department Of Arts And Sciences (information Science) Osaka Kyoiku University
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Seo Yuki
Faculty Of Engineering Shibaura Institute Of Technology
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FUJII Masatoshi
Department of Chemistry, Tokyo Metropolitan University
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MACHINAMI Rikuo
Department of Pathology, Cancer Institute, Japanese Foundation for Cancer Research
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KAMEI EIZABURO
MAEBASHI INSTITUTE OF TECHNOLOGY
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MATSUMOTO AKEMI
NOSE SENIOR HIGHSCHOOL
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SEO YUKI
TENNOJI BRANCH, SENIOR HIGHSCHOOL, OSAKA KYOIKU UNIVERSITY
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SEKIHARA Hisahiko
Department of Internal Medicine III, Yokohama City University School of Medicine
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Sekihara Hisahiko
Department Of Endocrinology And Metabolism Yokohama City University Graduate School Of Medicine
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Sekihara Hisahiko
Department Of Internal Medicine And The Department Of Pathology Facully Of Medicine University Of To
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Fujii Jun
Department Of Mathematics Osaka Kyoiku University
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Seo Yuki
Tennoji Branch Senior Highschool Osaka Kyoiku University
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Fujii Jun
Department Of Arts And Sciences Osaka Kyoiku University
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Takahasi Sin-ei
Department Of Basic Technology Applied Mathematics And Physics Yamagata University
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Matsumoto Akemi
Nose Highschool
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Machinami Rikuo
Department Of Internal Medicine And The Department Of Pathology Facully Of Medicine University Of To
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KURAMOTO KIZUKI
Department of Internal Medicine and the Department of Pathology, Facully of Medicine, University of
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KIAN MOHSEN
DEPARTMENT OF PURE MATHEMATICS, FERDOWSI UNIVERSITY OF MASHHAD
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MOSLEHIAN MOHAMMAD
DEPARTMENT OF PURE MATHEMATICS, CENTER OF EXCELLENCE IN ANALYSIS ON ALGEBRAIC STRUCTURES (CEAAS), FE
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Kian Mohsen
Department Of Pure Mathematics Ferdowsi University Of Mashhad
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Moslehian Mohammad
Department Of Pure Mathematics Center Of Excellence In Analysis On Algebraic Structures (ceaas) Ferd
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Kuramoto Kizuki
Department Of Internal Medicine And The Department Of Pathology Facully Of Medicine University Of To
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Fujii Jun
Department Of Internal Medicine And The Department Of Pathology Facully Of Medicine University Of To
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Nakamura Masahiro
Department Of Mathematics Osaka Kyoiku University
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KIM YOUNG
DEPARTMENT OF MATHEMATICS, SUWON UNIVERSITY
著作論文
- KANTOROVICH TYPE INEQUALITIES FOR THE DIFFERENCE WITH TWO NEGATIVE PARAMETERS
- KANTOROVICH TYPE INEQUALITIES CHARACTERIZE THE CHAOTIC ORDER FOR POSITIVE OPERATORS
- THE HIAI-PETZ GEODESIC FOR STRONGLY CONVEX NORM IS THE UNIQUE SHORTEST PATH
- On Operator Inequalities due to Ando-Kittaneh-Kosaki
- A KANTOROVICH TYPE INEQUALITY WITH A NEGATIVE PARAMETER
- ANDO'S THEOREM FOR HADAMARD PRODUCTS AND OPERATOR MEANS
- OPERATOR VALUED DETERMINANT AND HADAMARD PRODUCT
- RICCATI EQUATION AND THE FIEDLER-PTAK SPECTRAL GEOMETRIC MEAN
- A Case of Myocardial Infarction : Caused by the Dissecting Aneurysm of the Aorta
- OPERATOR Q-CLASS FUNCTIONS
- KUBO-ANDO THEORY FOR CONVEX FUNCTIONAL MEANS
- AN EXTERNAL VERSION OF THE JENSEN OPERATOR INEQUALITY
- BHATIA-KITTANEH'S OPERATOR NORM INEQUALITY
- COOPER'S APPROACH TO CHAOTIC OPERATOR MEANS
- A CHARACTERIZATION OF THE HARMONIC OPERATOR MEAN AS AN EXTENSION OF ANDO'S THEOREM
- PATH OF BREGMAN-PETZ OPERATOR DIVERGENCE