Displacement Exponent of Self-Repelling Walks
スポンサーリンク
概要
- 論文の詳細を見る
We construct a family of self-repelling and self-attracting walks (stochastic chains) on the (infinite) pre-{\sg}.The family continuously interpolates the simple random walk and a self-avoiding walk. The asymptotic behavior of the walks is given in terms of the displacement exponent.
- 東京大学の論文
著者
-
Hattori Kumiko
Department Of Mathematical Sciences Shinshu University
-
Hattori Tetsuya
Mathematical Institute Graduate School Of Science Tohoku University
関連論文
- Sales ranks, Burgers-like equations, and least-recently-used caching : Dedicated to Prof. K.R. Ito on his 60th birthday (Applications of Renormalization Group Methods in Mathematical Sciences)
- Stochastic ranking process with time dependent intensities
- Self-avoiding Paths on the Three Dimensional Sierpinski Gasket : Dedicated to Professor H. Ezawa om his 60th birthday
- Gaussian Field Theories on General Networks and the Spectral Dimensions
- Fractal Geometry of Self-avoiding Processes
- Preventive Effect of Sulfamethoxasole-trimethoprim on Pneumocystis jiroveci Pneumonia in Patients with Interstitial Pneumonia
- Exact Hausdorff Dimension of Self-avoiding Processes on the Multi-dimensional Sierpinski Gasket
- Displacement Exponent of Self-Repelling Walks