Ginsparg-Wilson Relation and Admissibility Condition in Noncommutative Geometry(Instanton, Soliton and Index,NONCOMMUTATIVE GEOMETRY AND QUANTUM SPACETIME IN PHYSICS)
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概要
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Ginsparg-Wilson relation and admissibility condition have the key role to construct lattice chiral gauge theories. They are also useful to define the chiral structure in finite non-commutative geometries or matrix models. We discuss their usefulness briefly.
- 理論物理学刊行会の論文
- 2008-03-07
著者
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Nagao Keiichi
Theoretical Physics Laboratory College Of Education Ibaraki University
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NAGAO Keiichi
Theoretical Physics Laboratory, College of Education, Ibaraki University
関連論文
- Automatic Hermiticity
- Ginsparg-Wilson Relation and Admissibility Condition in Noncommutative Geometry(Instanton, Soliton and Index,NONCOMMUTATIVE GEOMETRY AND QUANTUM SPACETIME IN PHYSICS)