The geometry of continued fractions as analysed by considering Möbius transformations acting on the hyperbolic plane

dc.contributor.authorvan Rensburg, Richard
dc.date.accessioned2012-02-24T06:01:29Z
dc.date.available2012-02-24T06:01:29Z
dc.date.issued2012-02-24
dc.descriptionM.Sc., Faculty of Science, University of the Witwatersrand, 2011en_US
dc.description.abstractContinued fractions have been extensively studied in number-theoretic ways. In this text, we will illuminate some of the geometric properties of contin- ued fractions by considering them as compositions of MÄobius transformations which act as isometries of the hyperbolic plane H2. In particular, we examine the geometry of simple continued fractions by considering the action of the extended modular group on H2. Using these geometric techniques, we prove very important and well-known results about the convergence of simple con- tinued fractions. Further, we use the Farey tessellation F and the method of cutting sequences to illustrate the geometry of simple continued fractions as the action of the extended modular group on H2. We also show that F can be interpreted as a graph, and that the simple continued fraction expansion of any real number can be can be found by tracing a unique path on this graph. We also illustrate the relationship between Ford circles and the action of the extended modular group on H2. Finally, our work will culminate in the use of these geometric techniques to prove well-known results about the relationship between periodic simple continued fractions and quadratic irrationals.en_US
dc.identifier.urihttp://hdl.handle.net/10539/11345
dc.language.isoenen_US
dc.subjectTransformations (mathematics)en_US
dc.subjectNumbers, complexen_US
dc.subjectGeometry, hyperbolicen_US
dc.subjectMatrix groupsen_US
dc.titleThe geometry of continued fractions as analysed by considering Möbius transformations acting on the hyperbolic planeen_US
dc.typeThesisen_US
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