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11	Une application de la géométrie des nombres à une généralisation d'une fraction continue Pepper, Paul Milton. January 1900 (has links) Issued in English in 1937 as Thesis (Ph. D.)--Cincinnati. / From Annales scientifiques de l'Ecole normale supérieure. 3. sér., t. LVI, fasc. 1. Bibliography: p. 70.
12	On the Padé approximants associated with the continued fraction and series of Stieltjes Wall, H. S. January 1927 (has links) Thesis (Ph. D.)--University of Wisconsin--Madison, 1927. / Thesis note stamped on cover. Reprinted from the Transactions of the American mathematical society, vol. 31, no. 1. eContent provider-neutral record in process. Description based on print version record. Continued fractions. Series, Infinite.
13	Ueber Continuanten und gewisse ihrer Anwendungen im zahlentheoretischen Gebiete Moritz, Robert Édouard, January 1900 (has links) Inaug.-diss.--Kaiser Wilhelms-Universität zu Strassburg. / Lebenslauf. Determinants. Continued fractions.
14	Continued fractions Short, Ian Mark January 2005 (has links) No description available. 510 Continued fractions
15	A Theorem on the Convergence of a Continued Fraction Kostelec, John C. 01 1900 (has links) This thesis discusses a theorem on the convergence of a continued fraction. fraction Continued fractions.
16	Continued Fractions: A New Form Wiyninger, Donald Lee, III 01 May 2011 (has links) While the traditional form of continued fractions is well-documented, a new form, designed to approximate real numbers between 1 and 2, is less well-studied. This report first describes prior research into the new form, describing the form and giving an algorithm for generating approximations for a given real number. It then describes a rational function giving the rational number represented by the continued fraction made from a given tuple of integers and shows that no real number has a unique continued fraction. Next, it describes the set of real numbers that are hardest to approximate; that is, given a positive integer $n$, it describes the real number $\alpha$ that maximizes the value $\|\alpha - T_n\|$, where $T_n$ is the closest continued fraction to $\alpha$ generated from a tuple of length $n$. Finally, it lays out plans for future work. 11A55 Continued fractions Mathematics
17	The algebra and geometry of continued fractions with integer quaternion coefficients Mennen, Carminda Margaretha 06 May 2015 (has links) A dissertation submitted to the Faculty of Science, University of the Witwatersrand, Johannesburg, in fulfilment of requirements for the degree of Master of Science. 2015. / We consider continued fractions with coe cients that are in K, the quaternions. In particular we consider coe cients in the Hurwitz integers H in K. These continued fractions are expressed as compositions of M¨obius maps in M R4 1 that act, by Poincar´e extension, as isometries on H5. This dissertation explores groups of 2 2 matrices over K and two particular determinant type functions acting on these groups. On the one hand we find M R4 1 , the group of orientation preserving M¨obius transformations acting on R4 1 in terms of a determinant D [19],[38]. On the other hand K may be considered as a Cli ord algebra C3 based on two generators i and j, or more generally i1 and i2, where i j = k or i1i2 = k. It is shown this group of matrices over C4 defined in terms of a pseudo-determinant [1],[37] can also be used to establish M R4 1 . Through this relationship we are able to connect the determinant D to the pseudo-determinant when acting on the matrices that generate M R4 1 . We explore and build on the results of Schmidt [30] on the subdivision of a Farey simplex into 31 Farey simplices. These results are reinterpreted in H5 with boundary K1 using the group of M¨obius transformations on R4 1 [19], [38]. We investigate the unimodular group G = PS DL(2;K) with its generators and derive a fundamental domain for this group in H5. We relate this domain to the 24-cells PU and r that tessellate K. We define the concepts of Farey neighbours, Farey geodesics and Farey simplices in the Farey tessellation of H5. This tessellation of H5 by a Farey pentacross under a discrete subgroup G of M R4 1 is analogous to the Farey tessellation by Farey triangles of H2 under the modular group [31]. The result in Schmidt [30], that for each quaternion there is a chain of Farey simplices that converge to , is reinterpreted as a continued fraction, with entries from H, that converges to . We conclude with a review of Pringsheim’s theorem on convergence of continued fractions in higher dimensions [5]. Continued fractions. Quaternions. Algebra. Geometry.
18	The action of the picard group on hyperbolic 3-space and complex continued fractions Hayward, Grant Paul 11 August 2014 (has links) A dissertation submitted to the Faculty of Science, University of the Witwatersrand, Johannesburg, in fulfilment of the requirements for the degree of Master of Science. Johannesburg, 2013. / Continued fractions have been extensively studied in number theoretic ways. These continued fractions are expressed as compositions of M¨obius maps in the Picard group PS L(2;C) that act, by Poincar´e’s extension, as isometries on H3. We investigate the Picard group with its generators and derive the fundamental domain using a direct method. From the fundamental domain, we produce an ideal octahedron, O0, that generates the Farey tessellation of H3. We explore the properties of Farey neighbours, Farey geodesics and Farey triangles that arise from the Farey tessellation and relate these to Ford spheres. We consider the Farey addition of two rationals in R as a subdivision of an interval and hence are able to generalise this notion to a subdivision of a Farey triangle with Gaussian Farey neighbour vertices. This Farey set allows us to revisit the Farey triangle subdivision given by Schmidt [44] and interpret it as a theorem about adjacent octahedra in the Farey tessellation of H3. We consider continued fraction algorithms with Gaussian integer coe cients. We introduce an analogue of Series [45] cutting sequence across H2 in H3. We derive a continued fraction expansion based on this cutting sequence generated by a geodesic in H3 that ends at the point in C that passes through O0. Continued fractions. Picard groups. Hyperbolic spaces.
19	Arithmetic on Specializable Continued Fractions Merriam, Ross C. 30 May 2010 (has links) No description available. Continued fractions Mathematics Physical Sciences and Mathematics
20	De aequationibus secundi gradus indeterminatis Göpel, Adolph, January 1835 (has links) Thesis (doctoral)--Universitate Litteraria Friderica Guilelma, 1835. / Vita.

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