Nonlinear Klein-Gordon Equations for the Motion of the String
スポンサーリンク
概要
- 論文の詳細を見る
The string spans a two-dimensional surface in space-time during its motion. By the use of surface theory in differential geometry, the nonlinear Klein-Gordon equations have systematically been studied for a field describing the surface. They are exhausted by the following three families: the Liouville, hyperbolic sine-Gordon and sine-Gordon families.
- 一般社団法人日本物理学会の論文
- 1984-02-25
著者
-
KOBAYASHI Ken-Ichiro
Institute for Nuclear Study, University of Tokyo
-
KOBAYASHI Kenzo
Faculty of Engineering, Mie University
-
Kobayashi Kozo
Department of Physics, Saitama University
関連論文
- Numerical Simulation of the Single Electron Tunneling Processes in the Scanning Tunneling Spectroscopy through Metal Fine Particle
- Quantum Conserved Charges and S-Matrices in N=2 Supersymmetric Sine-Gordon Theory
- Unitarity in Gauge Symmetry Breaking on an Orbifold
- Finite-Range DWBA Analysis of Anomalous Analyzing Powers in (p,α) Reactions
- Momentum-Transfer Dependence of Nuclear Spin-Isospin Transitions : Nuclear Physics
- Gauge Independent Mechanism of Decoupling at Low Energies
- Spherical Functions in the 1+1 Conformal Group
- Nonlinear Klein-Gordon Equations for the Motion of the String
- Correlation due to Energy-Momentum Conservation in Multi-Particle Production Processes