TL;DR
This paper explores the application of non-commutative geometry, specifically the fuzzy torus, within string theory to illustrate how such mathematical structures can be utilized in theoretical physics.
Contribution
It provides a concise overview of non-commutative geometry and demonstrates its application in string theory through the example of the fuzzy torus.
Findings
Illustrates the use of fuzzy torus in string theory
Connects non-commutative geometry with string theoretical models
Provides foundational understanding for further research
Abstract
We outline a brief description of non commutative geometry and present some applications in string theory. We use the fuzzy torus as our guiding example.
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