Time-Dependent Random Matrix Theories on Non-Compact and Compact Non-Zero Curvature Spaces
スポンサーリンク
概要
- 論文の詳細を見る
Brownian motions on both non-compact and cornpact groups are considered. These unodels areshown to have unfanailiar interaction terms in the probability density functions for eigenvaluesof herrnitian random rnatrices which are realized as the coordinates of points in these spaces.Also shown are two point correlation ['unctions for these models, The differences between thernodels and from the conventional static randorn matrix theories are made clear.
- 社団法人日本物理学会の論文
- 1997-01-15
著者
-
Wadati Miki
Depatment Of Physics Graduate School Of Science The University Of Tokyo
-
AKUZAWA Toshinao
Depatment of Physics,Graduate School of Science,The University of Tokyo
-
Akuzawa Toshinao
Depatment Of Physics Graduate School Of Science The University Of Tokyo
関連論文
- Dynamic Matrix Product Ansatz and Bethe Ansatz Equation for Asymmetric Exclusion Process with Periodic Boundary
- Time-Dependent Random Matrix Theories on Non-Compact and Compact Non-Zero Curvature Spaces
- Orthogonality of the Hi-Jack Polynomials Associated with the Calogero Model