Arithmetic Properties of Values of Lacunary Series

dc.contributor.author	Bradshaw, Ryan
dc.contributor.supervisor	Roy, Damien
dc.date.accessioned	2013-09-12T14:35:40Z
dc.date.available	2013-09-12T14:35:40Z
dc.date.created	2013
dc.date.issued	2013
dc.degree.discipline	Sciences / Science
dc.degree.level	masters
dc.degree.name	MSc
dc.description.abstract	A lacunary series is a Taylor series with large gaps between its non-zero coefficients. In this thesis we exploit these gaps to obtain results of linear independence of values of lacunary series at integer points. As well, we will study different methods found in Diophantine approximation which we use to study arithmetic properties of values of lacunary series at algebraic points. Among these methods will be Mahler's method and a new approach due to Jean-Paul Bézivin.
dc.embargo.terms	immediate
dc.faculty.department	Mathématiques et statistique / Mathematics and Statistics
dc.identifier.uri	http://hdl.handle.net/10393/26108
dc.identifier.uri	http://dx.doi.org/10.20381/ruor-3208
dc.language.iso	en
dc.publisher	Université d'Ottawa / University of Ottawa
dc.subject	Lacunary Series
dc.subject	Linear independence
dc.subject	Fredholm Series
dc.subject	Mahler's Method
dc.subject	Method of Bezivin
dc.subject	The Gap Method
dc.title	Arithmetic Properties of Values of Lacunary Series
dc.type	Thesis
thesis.degree.discipline	Sciences / Science
thesis.degree.level	Masters
thesis.degree.name	MSc
uottawa.department	Mathématiques et statistique / Mathematics and Statistics

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