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51	A brief exploration of the Sorgenfrey line and the lexicographic order Greiwe, Regina M., Heath, Jo W. January 2006 (has links) (PDF) Thesis (M.S.)--Auburn University, 2006. / Abstract. Vita. Includes bibliographic references (p.37).
52	Obstructing sliceness in a family of Montesinos knots Williams, Luke M., January 2008 (has links) Thesis (M.S.)--University of Nevada, Reno, 2008. / "May, 2008." Includes bibliographical references (leaves 47-48). Online version available on the World Wide Web.
53	Finite CW-complexes / Campbell, Harold Edward Alexander, January 1978 (has links) Thesis (M.Sc.) -- Memorial University of Newfoundland. / Typescript. Bibliography : leaves 55-56. Also available online.
54	Infinite product groups / Penrod, Keith, January 2007 (has links) (PDF) Thesis (M.S.)--Brigham Young University. Dept. of Mathematics, 2007. / Includes bibliographical references (p. 27-28).
55	Stabilization of chromatic functors / Leeman, Aaron, January 2009 (has links) Typescript. Includes vita and abstract. Includes bibliographical references (leaves 33-34) Also available online in Scholars' Bank; and in ProQuest, free to University of Oregon users.
56	Mordell-Weil-Gitter und exotische Deformationen von Viereckssingularitäten der Einbettungsdimension drei / Gawlick, Thomas. January 1900 (has links) Thesis (doctoral)--Rheinische Friedrich-Wilhelms-Universität Bonn, 1995. / Includes bibliographical references (p. 138-142).
57	Grupo topológico Dutra, Aline Cristina Bertoncelo [UNESP] 10 November 2011 (has links) (PDF) Made available in DSpace on 2014-06-11T19:27:09Z (GMT). No. of bitstreams: 0 Previous issue date: 2011-11-10Bitstream added on 2014-06-13T18:30:56Z : No. of bitstreams: 1 dutra_acb_me_rcla.pdf: 707752 bytes, checksum: 003487414f094d392a97a22a4efb885b (MD5) / Neste trabalho tratamos do objeto matemático Grupo Topológico. Para este desenvolvimento, abordamos elementos básicos de Grupo e Espaço Topológico / In this work we consider the mathematical object Topological Group. For this development, we discuss the basic elements of the Group and Topological Space Topologia algebrica Topologia Álgebra Algebraic topology Topology
58	Constructing a v2 Self Map at p=3 Reid, Benjamin 06 September 2017 (has links) Working at the prime p = 3, we construct a stably finite spectrum, Z, with a v_2^1 self map f. Further, both Ext_A(H(Z),Z_3) and Ext_A(H(Z),H*(Z)) have a vanishing line of slope 1/16 in (t-s,s) coordinates, and the map f is represented by an element a of Ext where multiplication by a is parallel to the vanishing line. To accomplish this construction, we prove a result about the connection between particular self maps of spectra and their effect on the Margolis homology of related modules over the Steenrod Algebra. Algebraic topology Stable Homotopy Theory v_n Periodicity
59	Contributions to the theory of nearness in pointfree topology Mugochi, Martin Mandirevesa 09 1900 (has links) We investigate quotient-fine nearness frames, showing that they are reflective in the category of strong nearness frames, and that, in those with spatial completion, any near subset is contained in a near grill. We construct two categories, each of which is shown to be equivalent to that of quotient-fine nearness frames. We also consider some subcategories of the category of nearness frames, which are co-hereditary and closed under coproducts. We give due attention to relations between these subcategories. We introduce totally strong nearness frames, whose category we show to be closed under completions. We investigate N-homomorphisms and remote points in the context of totally bounded uniform frames, showing the role played by these uniform N-homomorphisms in the transfer of remote points, and their relationship with C -quotient maps. A further study on grills enables us to establish, among other things, that grills are precisely unions of prime filters. We conclude the thesis by showing that the lattice of all nearnesses on a regular frame is a pseudo-frame, by which we mean a poset pretty much like a frame except for the possible absence of the bottom element. / Mathematical Sciences / Ph.D. (Mathematics) 514.2 Algebraic topology Homotopy theory Homomorphisms (Mathematics)
60	Sobre os grupos de Gottlieb / Pinto, Guilherme Vituri Fernandes. January 2016 (has links) Orientador: Thiago de Melo / Banca: Alice Kimie Miwa Libardi / Banca: Oziride Manzoli Neto / Resumo: O objetivo deste trabalho é estudar grande parte do artigo [6], no qual Gottlieb define o subgrupo G(X, x0) de 'pi'1(X, x0) (em que X é um CW-complexo conexo por caminhos), posteriormente chamado de "grupo de Gottlieb"; o calculamos para diversos espaços, como as esferas, o toro, os espaços projetivos, a garrafa de Klein, etc; posteriormente, estudamos o artigo [22] de Varadarajan, que generalizou o grupo de Gottlieb para um subconjunto G(A, X) de [A, X]. Por fim, calculamos G(S[n], S[n]) / Abstract: The goal of this work is to study partialy the article [6], in which Gottlieb has defined a subgroup G(X, x0) of 'pi'1(X, x0) (where X is a path-connected CW-complex based at x0), called "Gottlieb group" in the literature. This group is computed in this work for some spaces, namely the spheres, the torus, the projective spaces, and the Klein bottle. Further, a paper by Varadarajan[22] who has generalized Gottlieb group to a subset G(A, X)of [A, X] is studied. Finally, the groups G(S[n], S[n]) is computed / Mestre Matemática. Topologia algebrica. Teoria de homotopia Algebraic topology

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