A Solution of the Inhomogeneous Bloch Equation for a Class of Time-Varying Magnetic Fields(Condensed Matter and Statistical Physics)
スポンサーリンク
概要
- 論文の詳細を見る
A solution of the inhomogeneous Bloch equation is given for a class of time-varying magnetic fields. A method of determining the fundamental system of the homogeneous Bloch equation employing the characteristics of the Riccati equation is formulated. It turns out that the fundamental matrix is an orthogonal matrix. A brief discussion of the characteristics of the magnetic field class and an illustrative example are given.
- 理論物理学刊行会の論文
- 2004-11-25
著者
-
KOBAYASHI Masanori
Physics Department, Gifu University
-
Kobayashi Masanori
Department Of Physics Graduate School Of Science Kyoto University
関連論文
- Collective Paths Connecting the Oblate and Prolate Shapes in ^Se and ^Kr Suggested by the Adiabatic Self-Consistent Collective Coordinate Method(Nuclear Physics)
- Collective Path Connecting the Oblate and Prolate Local Minima in ^Se
- Application of the Adiabatic Self-Consistent Collective Coordinate Method to a Solvable Model of Prolate-Oblate Shape Coexistence(Nuclear Physics)
- Rarita-Schwinger Paradoxes as a Common Disease in Constrained Systems
- A Solution of the Inhomogeneous Bloch Equation for a Class of Time-Varying Magnetic Fields(Condensed Matter and Statistical Physics)