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1	Nonparacompactness in para-Lindelöf spaces Navy, Caryn Linda. January 1900 (has links) Thesis (Ph. D.)--University of Wisconsin--Madison, 1981. / Typescript. Vita. eContent provider-neutral record in process. Description based on print version record. Includes bibliographical references (leaves 64-65). Compact spaces.
2	Paracompactness in monotonically normal spaces Palenz, Diana Gail Pike. January 1900 (has links) Thesis (Ph. D.)--University of Wisconsin--Madison, 1980. / Typescript. Vita. eContent provider-neutral record in process. Description based on print version record. Includes bibliographical references (leaves 87-88). Compact spaces.
3	Uniform Locally Compact Spaces Page, Perman Hutson 12 1900 (has links) The purpose of this paper is to develop some properties of uniformly locally compact spaces. The terminology and symbology used are the same as those used in General Topology, by J. L. Kelley. compact spaces topology mathematics
4	I-weight, special base properties and related covering properties Bailey, Bradley S., January 2005 (has links) (PDF) Thesis (Ph.D.)--Auburn University, 2005. / Abstract. Vita. Includes bibliographic references (ℓ. 69-70)
5	Applications of elementary submodels in topology / Dolph Bosely, Laura. January 2009 (has links) Thesis (Ph.D.)--Ohio University, August, 2009. / Release of full electronic text on OhioLINK has been delayed until September 1, 2012. Includes bibliographical references (leaves 110-113)
6	Applications of elementary submodels in topology Dolph Bosely, Laura. January 2009 (has links) Thesis (Ph.D.)--Ohio University, August, 2009. / Title from PDF t.p. Release of full electronic text on OhioLINK has been delayed until September 1, 2012. Includes bibliographical references (leaves 110-113)
7	Two scale compactification of the E(8)xE(8) heterotic string / 2 scale compactification of E(8)xE(8) heterotic string. Walton, Mark, 1960- January 1987 (has links) A simple two scale compactification scheme for the E(8) x E(8) heterotic string is studied. The internal space used is a direct product of two compact spaces, each with its own length scale. Compactification on the smaller 4-dimensional (4d) manifold is carried out to obtain 6d theories with simple supersymmetry (SUSY). Assuming the background torsion vanishes, we show that this manifold must be K3. Compactification on K3 is studied in detail. Also analyzed are the two possible torsion-free compactifications on the orbifold K3$ sp prime$ (the limit of the manifold K3). The compactification from 6d to 4d on the larger scale 2d manifold results in Grand Unified Theories (GUT's) with broken SUSY. We show that it is not possible to generate a realistic theory using our scheme. Strings exclude what is conceivable from the perspective of point field theories: getting a realistic GUT from a 6d theory with simple SUSY. String models Superstring theories Compact spaces
8	N-compact frames and applications. Schlitt, Greg. Banaschewski, B. Unknown Date (has links) Thesis (Ph.D.)--McMaster University (Canada), 1990. / Source: Dissertation Abstracts International, Volume: 52-10, Section: B, page: 5312. Supervisor: B. Banaschewski.
9	Compactness under constructive scrutiny : a thesis submitted in partial fulfilment of the requirements for the degree of Doctor of Philosophy in Mathematics, University of Canterbury, Department of Mathematics and Statistics / Diener, Hannes. January 2008 (has links) Thesis (Ph. D.)--University of Canterbury, 2008. / Typescript (photocopy). Includes bibliographical references (p. 103-105). Also available via the World Wide Web.
10	Two scale compactification of the E(8)xE(8) heterotic string Walton, Mark, 1960- January 1987 (has links) No description available. Compact spaces Superstring theories String models

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