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1	Finite projective planes and related topics Fleming, Patrick Scott. January 2006 (has links) Thesis (Ph. D.)--University of Wyoming, 2006. / Title from PDF title page (viewed on Dec. 20, 2007). Includes bibliographical references (p. 201-202). Geometry, Projective. Projective planes.
2	On quadratic extensions of cyclic projective planes Law, Hiu-fai, 羅曉輝 January 2006 (has links) published_or_final_version / abstract / Mathematics / Master / Master of Philosophy Projective planes.
3	Concerning t-spreads of PG ((s + 1) (t + 1)- 1, q) O'Keefe, Christine M. January 1987 (has links) (PDF) Bibliography: leaves 211-217. Geometry, Projective
4	On quadratic extensions of cyclic projective planes Law, Hiu-fai, January 2006 (has links) Thesis (M. Phil.)--University of Hong Kong, 2006. / Title proper from title frame. Also available in printed format. Projective planes.
5	Mehrdeutige Verwandtschaften zwischen Punktfeldern, insbesondere solche, welche durch Raumkurven veranlasst werden Broll, Gerhard, January 1911 (has links) Thesis (doctoral)--Universität Breslau, 1911. / Vita. Includes bibliographical references. Geometry, Projective.
6	On Wilbrink's characterization of the classical unital Cheung, Chung-ching., 張中正. January 2011 (has links) published_or_final_version / Mathematics / Master / Master of Philosophy Projective planes.
7	Characterizations and embedding of unitary block designs Hui, Man-wa, 許敏華 January 2014 (has links) A (finite) projective plane of order m, m an integer greater than 1, is a 2- (m^2 + m + 1, m + 1, 1) design. A unital (or a unitary block design) U of order n, n an integer greater than 2, is a 2-(n^3 + 1, n + 1, 1) design. An embedded unital is one that is a subdesign of a projective plane. If a unital of order n is embedded in a projective planeπ, then the order of π is at least n^2. A unital of order n embedded in a projective planeπ of order n^2 is called a polar unital if it consists of the absolute points and non-absolute lines of a unitary polarity of π. In particular, if π is the classical (Desarguesian) plane PG(2, q^2) coordinatized by the finite field Fq^2, then the polar unital is called a classical unital. The main problem in the study of unitals is their characterization and classification. The classical unital does not contain a configuration of four lines meeting in six points (an O'Nan configuration) [O'Nan, 1972]. It is conjectured that this property characterizes the classical unital [Piper, 1979]. The classical unital is characterized by three conditions (I), (II) and (III): (I) is the absence of O'Nan configurations; (II) and (III) are further configurational requirements [Wilbrink, 1983]. The result depends on the classification of finite doubly transitive groups. Furthermore, when the order of a unital is even, (III) is a necessary condition of (I) and (II) [Wilbrink, 1983]. As for group theoretic characterizations, the only unitals that admit doubly transitive automorphism groups are the classical unitals and the Ree unitals [Kantor, 1985]. The classical unital is also characterized by the existence of sufficiently many translations [Grundhöfer, Stroppel, Van Maldeghem, 2013]. In this thesis, a necessary and sufficient condition is given for embedding a unital into a projective plane as a polar unital. A strengthened version of the condition is introduced and is shown to be necessary for a classical unital. Using the strengthened condition and results of [Wilbrink,1983] and [Grundhöfer, Stroppel and Van Maldeghem, 2013], a new intrinsic characterization of the classical unital is given without assuming the absence of O'Nan configurations. Finally, a unital of even order satisfying the first two intrinsic characterization conditions of Wilbrink is shown to be classical without invoking deep results from group theory. / published_or_final_version / Mathematics / Doctoral / Doctor of Philosophy Projective planes
8	Concerning t-spreads of PG ((s + 1) (t + 1)- 1, q) / O'Keefe, Christine M. January 1987 (has links) (PDF) Thesis (Ph. D.)--University of Adelaide, 1988. / Includes bibliographical references (leaves 211-217). Geometry, Projective.
9	Over de arithmetisering van axiomatische meetkunden Geldof, Johanna Adriana. January 1951 (has links) Proefschrift--Amsterdam. / "Stellingen": [2] leaves inserted. Bibliography: p. [117]-118. Geometry, Projective.
10	Neofields Paige, Lowell J. January 1947 (has links) Thesis (Ph. D.)--University of Wisconsin, 1947. / Typewritten. Vita. Bibliography: l. 69. Geometry, Projective.

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