Hermitian Fermi Coordinates, Dimensions and Path Integrals : Progress Letters
スポンサーリンク
概要
- 論文の詳細を見る
Quantized unconstrained fermi systems, Z_2 graded Clifford algebras, of finite arbitrary dimension n are analyzed in terms of hermitian fermi operators, where 2^<[(n+1)/2]> dimensional irreducible representations are discussed and odd dimensions are focussed upon. Path integral formula for the system is rigorously presented in terms of real Grassmann numbers via the reducible representation of the system.
- 理論物理学刊行会の論文
- 1990-03-25
著者
-
NAKAJIMA Hideo
Research Institute for Fundamental Physics, Kyoto University
-
Nakajima Hideo
Laboratory Of Applied Mathematics And Mathematical Physics Department Of Information Science Utsunom
-
NAKAJIMA Hiroaki
Department of Physics, Chuo University
-
NAKAJIMA Hideo
Laboratory of Applied Mathematics and Mathematical Physics Department of Information Science, Utsunomiya University
関連論文
- Supersymmetry and Quenched Random Fields Revisited
- Supersymmetric Extension of the Non-Abelian Scalar-Tensor Duality
- Structure of the Gauge Transformation Group in the Square Integrable Space and Gribov's Ambiguity in the Coulomb Gauge
- Spontaneous Breaking of Chiral Symmetry in a Vector-Gluon Model
- Singular Lagrangian an the Dirac-Feddeev Method : Existence Theorems of constraints in 'Standard Form'
- Spontaneous Breaking of Chiral Symmetry in a Vector-Gluon Model. II
- How Dense Are the Coulomb Gauge Fixing Degeneracies? : Geometrical Formulation of the Coulomb Gauge
- Hermitian Fermi Coordinates, Dimensions and Path Integrals : Progress Letters
- Spectral Problem of N×N Matrix Differential Operators on the Line
- Supersymmetric CP^N Sigma Model on Noncommutative Superspace