Examples of Static Localized Solutions of Nonlinear Equations in 3+1 Dimensions. II : Asymptotic Analysis : Particles and Fields
スポンサーリンク
概要
- 論文の詳細を見る
A scaling operator conserved by self-interacting nonlinear system, is introduced. Solutions of nonlinear equations, introduced in a previous article, are analysed with respect to their scaling properties. As a result, the solutions can be classified into two categories according to whether they are invariant for scaling or not. The ones which are not invariant for scaling are perturbative solutions. The other class of solutions are characteristic functions of the scaling operator with vanishing characteristic value and are non-perturbative. These are isolated solutions suitable for describing elementary particles.
- 理論物理学刊行会の論文
- 1986-04-25
著者
-
Umezawa Minoru
Centre De Recherches Nucleaires Universite Louis Pasteur
-
UMEZAWA Minoru
Centre de Recherches Nucleaires, Universite Louis Pasteur
-
UMEZAWA Minoru
Centre de Recherches Nucleaires et Universite Louis Pasteur de Strasbourg
関連論文
- Examples of Static Localized Solutions of Nonlinear Equations in 3+1 Dimensions. II : Asymptotic Analysis : Particles and Fields
- A Model of the Extended Object as an Elementary Particle : Particles and Fields