Generalization of Tomimatsu-Sato Solution. II
スポンサーリンク
概要
- 論文の詳細を見る
It is shown that the Ernst equation, which is a nonlinear partial differential equation, can be reduced to a set of linear partial differntial equations and a nonlinear ordinary differential equation.
- 理論物理学刊行会の論文
- 1996-03-25
著者
-
Shoichi HORI
Department of Physics, Kanazawa University
-
HORI Shoichi
Faculty of General Educations, Kanazawa University:Kanazawa University
関連論文
- Eight Quark Model with Modified Left-Handed Currents
- A Possible Interpretation of ψ-Particles in the Framework of Three-Quartet Model
- Complete Solution of the Ernst Equation in a Stationary and Axially Symmetric Gravitational Field Due to a Rotating Source
- Solution with Real Value of Deformation Parameter for Ernst Equation in Gravitational Field Caused by Rotating Source
- A Solution of the Einstein Equation in a Stationary Gravitational Field Due to a Rotating Source : Astrophysics and Relativity
- Nonlinear Realization of Conformal Symmetry
- Generalization of the Tomimatsu-Sato Solutions
- Is KNO Scaling Uniformly Convergent?
- On the Exact Solution of Tomimatsu-Sato Family for an Arbitrary Integral Value of the Deformation Parameter
- A Phenomenology of the Semi-Inclusive Reaction in Proton-Proton Collisions
- Generalization of Tomimatsu-Sato Solutions. I
- Precocious KNO Scaling and Polya-Like Distribution
- On the Multiplicity Distribution in Semi-Inclusive Reactions
- Generalization of Tomimatsu-Sato Solution. II
- Generalization of Tomimatsu-Sato Solutions. IV : Astrophysics and Relativity
- Generalization of Tomimatsu-Sato Solutions. III