Phase Transition in Coupled Order Parameter System : Condensed Matter and Statistical Physics
スポンサーリンク
概要
- 論文の詳細を見る
The system with two order parameters is investigated theoretically. This system is described by Landau model with a biquadratic coupling between the two order parameters, each of which involves the second order phase transition. Phases which can result from competition between the order parameters are found, and phase diagrams are shown. Transition structure among the phases and thermodynamical properties in the phases are investigated. Application to magnetic system is discussed.
- 理論物理学刊行会の論文
- 1985-06-25
著者
-
USUI Tunemaru
Department of Physics, Nagoya University
-
Usui T
Department Of Physics Nagoya University
-
Usui Tunemaru
Department Of Physics Nagoya University
-
WATANABE Sachio
Department of Physics, Nagoya University
-
Watanabe S
Nec Corp.
-
Watanabe Sachio
Department Of Physics Faculty Of Science Nagoya University
関連論文
- Symmetry of the Ground-State Wave Function of Many Particle System
- Angular Momentum in Superfluid ^3He-A at Finite Temperatures
- Phase Transition in Coupled Order Parameter System : Condensed Matter and Statistical Physics
- Hydrodynamics of Liquids with Intrinsic Angular Momentum : Case of ^3He-A
- Mobility of Negative Ions along Superfluid Vortices
- Superfluid Vortex, Trapping Neutral Impurities
- Superfluid Film of Helium near the Lambda-Point
- Phase Separation in Rotating Helium
- Critical Scattering of Excess Electrons in Non-Polar Fluids
- Localization of an Excess Electron in Non-Polar Fluids near Critical Points
- Density-Depenedent Electron Mobility in Non-Polar Fluids along Critical Isotherm
- Effect of Long-Wavelength Fluctuations on Ion Mobility in Fluid
- Excessive Electrons in Fluids near Critical Points
- Critical Velocity of Superfluid Helium Films
- Theory of the Relaxation Time of the Bose-Einstein Condensate
- Gauge Wheel of Superfluids
- Intrinsic Angular Momentum and Mass Current in Superfluid ^3He-A
- Phenomenological Theory of Superfluidity near the λ-Point