Please use this identifier to cite or link to this item: http://hdl.handle.net/123456789/400
Title: Arithmetic Geometric aspects of modular groups
Authors: Gupta, Titiksh
Gongopadhyay, Krishnendu
Keywords: Hyperbolic Geometry
Mathematics
Poincar ́e Disc Model
Trigonometry
Fuchsian groups
Mobius Transformation
Issue Date: 22-Jul-2014
Publisher: IISER M
Abstract: The aim of this THESIS is to highlight the major developments in the arithmetic-geometric aspects of the modular group. After covering geomet- ric aspects of Fuchsian groups, we study various variants of the Poincar ́e polygon theorem. Arithmetic methods like Farey Symbols have been used to describe the subgroups of P SL(2, Z). Graph-theoretical approach has been used to study algorithm for generating all trivalent diagrams. Finally, we conclude by describing algorithms for testing membership of matrices in P SL(2, Z) by using the concept of Farey Symbols.
URI: http://hdl.handle.net/123456789/400
Appears in Collections:MS-09

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