A CHARACTERISTIC OF THE 4-DIMENSIONAL EINSTEIN MANIFOLDS
スポンサーリンク
概要
- 論文の詳細を見る
- 1997-12-01
著者
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Kawaguchi Hiroaki
Dept. Of Information Sciences Shonan Institute Of Technology
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Ivanova Raina
Dept. Of Descriptive Geometry Univ. Of Architecture Civil Eng. & Geodesy
関連論文
- A REPRESENTATION OF THE CURVATURE TENSOR OF SOME 4-DIMENSIONAL EINSTEIN MANIFOLDS
- SOME NEW FACTS, RELATIONS AND CHARACTERISTICS IN INFORMATION GEOMETRY AND THEIR RIEMANNIAN FOUNDATIONS
- ON THE STATISTICAL PARAMETER SPACE CONSTITUTED BY THE LOGISTIC DENSITY FUNCTION
- GENERALIZATION OF A PROPERTY OF SOME 4-DIMENSIONAL EINSTEIN MANIFOLDS
- A SYSTEM OF CURVATURE CONDITIONS FOR SOME 4-DIMENSIONAL EINSTEIN MANIFOLDS
- 4-DIMENSIONAL RIEMANNIAN MANIFOLDS CHARACTERIZED BY A SKEW-SYMMETRIC CURVATURE OPERATO
- ON THE RIEMANNIAN MANIFOLDS OF CONSTANT SECTIONAL CURVATURE
- A CHARACTERISTIC OF THE 4-DIMENSIONAL EINSTEIN MANIFOLDS
- 4-DIMENSIONAL RIEMANNIAN MANIFOLDS, CHARACTERIZED BY SOME QUADRATIC CURVATURE CONDITIONS
- AN INTERPRETATION OF THE RIEMANNIAN CURVATURE IN A STASTISTICAL PARAMETER SPACE
- A REPRESENTATION OF THE CURVATURE TENSOR OF SOME 4-DIMENSIONAL EINSTEIN MANIFOLDS
- POINT-WISE CONSTANCY OF THE SKEW-SYMMETRIC CURVATURE OPERATOR'S CHARACTERISTIC COEFFICIENTS
- ON SOME PROPERTIES OF THE STATISTICAL PARAMETER SPACE OF THE MULTIVARIATE NORMAL DISTRIBUTION
- ON SOME PROPERTIES OF THE STATISTICAL PARAMETER SPACE OF THE MULTIVARIATE NORMAL DISTRIBUTION
- A SKEW-SYMMETRIC CURVATURE OPERATOR IN THE 3-DIMENSIONAL RIEMANNIAN MANIFOLDS
- GEOMETRIC CHARACTERIZATION OF A STATISTICAL PARAMETER SPACE