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Department Of Pure And Applied Sciences University Of Tokyo | 論文
- 1/n Expansion Up to Order 1/n^2. IV : Critical Amplitude Ratio R_x
- Renormalized Field Theory of Random Magnetic Mixtures with Competing Spin Anisotropies. I
- High Temperature Expansion for the Ising Model on the Dual Penrose Lattice
- Geometry of Undecidable Systems
- Two-Dimensional Defect in Three-Dimensional Lattice : Local Critical Exponent η' Up to λ^3 in the Limit n→∞
- Scaling Function for Critical Scattering in 1/n Expansion : Numerical Results for Three-Dimension
- Crossover Exponent of the Spin Anisotropic n-Vector Model with Short-Range Interaction in 1/n Expansion
- Nonlocal Ginzburg-Landau Model for High-Temperature Superconductors in a Magnetic Field : Condensed Matter and Statistical Physics
- Logarithmic Corrections to a Simple Power Law at d=4 in 1/n Expansion
- Note on Scaling Function for Critical Scattering in 1/n Expansion
- Breakdown of Some Scaling Law Relations in 1/n Expansion
- Critical Exponents and Scaling Relations in 1/n Expansion. II : Classical n-Vector Model with Short-Range Interaction
- An Adaptive Network of Economic Production Processes (経済物理学--社会・経済への物理学的アプローチ)
- An Adaptive Network of Economic Production Processes (経済物理学--社会・経済への物理学的アプローチ)
- Scaling Function for Equation of State : Weakly Random System in the Limit n→∞
- Charge-Density-Wave Behavior at Low Temperature in K_0.3MoO_3 : II. LOW TEMPERATURE PROPERTIES OF SOLIDS : Charge Density Waves
- Localization, Nonlinear σ Model and String Theory
- Structure of the scattering operator for time-periodic Schrödinger equations
- The Optical Spectrum of HgI_2
- Renormalized Field Theory of Random Magnetic Mixtures with Competing Spin Anisotropies. II : Condensed Matter and Statistical Physics