Critical Exponents for Long-Range Interactions. II : Universality and Scaling Relations
スポンサーリンク
概要
- 論文の詳細を見る
A general formulation for the expansion of the partition function in inverse powers of spin dimensionality n is given in the classical n-vector model in the presence of an inhomogeneous magnetic field. The critical exponents δ and η have been evaluated through the first order of 1/n, as functions of dimensionality d and potential-range σ. The universality and scaling relations on the critical exponents have been partially verified.
- 理論物理学刊行会の論文
- 1973-04-25
著者
関連論文
- On the Critical Behavior of the Two-Dimensional Heisenberg-Ising Model
- Calculation of the Cross-Over Exponent by Using Callan-Symanzik Equations
- Fractal Configurations of the Two- and Three-Dimensional Ising Models at the Critical Point : Condensed Matter and Statistical Physics
- One-Dimensional Anisotropic Heisenberg Model at Finite Temperatures
- On the Expansion Theory of Critical Exponents : General Aspects and Some Applications
- Scaling with a Parameter in Spin Systems near the Critical Point. I
- Critical Exponents for Long-Range Interactions. II : Universality and Scaling Relations
- On the Singularity of Dynamical Response and Critical Slowing Down
- On the Distribution of Zeros for the Heisenberg Model