Matrix Model and Ginsparg-Wilson Relation
Keiichi Nagao
TL;DR
This paper explores how the Ginsparg-Wilson relation can be utilized to define chiral structures within finite matrix models and noncommutative geometries, advancing lattice chiral gauge theory.
Contribution
It demonstrates the application of the Ginsparg-Wilson relation in finite matrix models and noncommutative geometries for chiral structure definition.
Findings
Ginsparg-Wilson relation applicable to matrix models
Chiral structures can be defined in noncommutative geometries
Potential implications for lattice chiral gauge theories
Abstract
We discuss that the Ginsparg-Wilson relation, which has the key role in the recent development of constructing lattice chiral gauge theory, can play an important role to define chiral structures in finite matrix models and noncommutative geometries.
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