A remark on independence in projective spaces
S. Fajtlowicz (1968)
Colloquium Mathematicae
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Displaying similar documents to “Lower bounds on the projective heights of algebraic points”
A remark on independence in projective spaces
Estimating heights using auxiliary functions
Charles L. Samuels (2009)
Acta Arithmetica
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q-Completeness of Subsets in Complex Projective Space.
Mathias Peternell (1987)
Mathematische Zeitschrift
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Deforming real projective structures.
Gallo, Daniel M. (1997)
Annales Academiae Scientiarum Fennicae. Mathematica
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Homography in ℝℙ
Roland Coghetto (2016)
Formalized Mathematics
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The real projective plane has been formalized in Isabelle/HOL by Timothy Makarios [13] and in Coq by Nicolas Magaud, Julien Narboux and Pascal Schreck [12]. Some definitions on the real projective spaces were introduced early in the Mizar Mathematical Library by Wojciech Leonczuk [9], Krzysztof Prazmowski [10] and by Wojciech Skaba [18]. In this article, we check with the Mizar system [4], some properties on the determinants and the Grassmann-Plücker relation in rank 3 [2], [1], [7],...
A generalization of a theorem of Schinzel
Georges Rhin (2004)
Colloquium Mathematicae
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We give lower bounds for the Mahler measure of totally positive algebraic integers. These bounds depend on the degree and the discriminant. Our results improve earlier ones due to A. Schinzel. The proof uses an explicit auxiliary function in two variables.
Constants for lower bounds for linear forms in the logarithms of algebraic numbers I. The general case
Josef Blass, A. Glass, David Manski, David Meronk, Ray Steiner (1990)
Acta Arithmetica
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A projective characterization of cyclicity.
Boskoff, Wladimir G., Suceavă, Bogdan D. (2008)
Beiträge zur Algebra und Geometrie
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Combinatorial Grassmannians
Andrzej Owsiejczuk (2007)
Formalized Mathematics
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In the paper I construct the configuration G which is a partial linear space. It consists of k-element subsets of some base set as points and (k + 1)-element subsets as lines. The incidence is given by inclusion. I also introduce automorphisms of partial linear spaces and show that automorphisms of G are generated by permutations of the base set.
Lamé operators with projective octahedral and icosahedral monodromies
Keiri Nakanishi (2005)
Rendiconti del Seminario Matematico della Università di Padova
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On the coexistence of various geometries
Marek Kordos (1989)
Colloquium Mathematicae
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Pascal’s Theorem in Real Projective Plane
Roland Coghetto (2017)
Formalized Mathematics
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In this article we check, with the Mizar system [2], Pascal’s theorem in the real projective plane (in projective geometry Pascal’s theorem is also known as the Hexagrammum Mysticum Theorem)1. Pappus’ theorem is a special case of a degenerate conic of two lines. For proving Pascal’s theorem, we use the techniques developed in the section “Projective Proofs of Pappus’ Theorem” in the chapter “Pappus’ Theorem: Nine proofs and three variations” [11]. We also follow some ideas from Harrison’s...
Embeddings of projective Klingenberg planes in the projective space PG(5,).
Keppens, Dirk, Van Maldeghem, Hendrik (2009)
Beiträge zur Algebra und Geometrie
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Projective spaces of second order.
Andrzej Miernowski, Witold Mozgawa (1997)
Collectanea Mathematica
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Grassmannians of higher order appeared for the first time in a paper of A. Szybiak in the context of the Cartan method of moving frame. In the present paper we consider a special case of higher order Grassmannian, the projective space of second order. We introduce the projective group of second order acting on this space, derive its Maurer-Cartan equations and show that our generalized projective space is a homogeneous space of this group.