Articoli correlati a Linear Algebra And Projective Geometry
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Geared toward upper-level undergraduates and graduate students, this text establishes that projective geometry and linear algebra are essentially identical. The supporting evidence consists of theorems offering an algebraic demonstration of certain geometric concepts. These focus on the representation of projective geometries by linear manifolds, of projectivities by semilinear transformations, of collineations by linear transformations, and of dualities by semilinear forms. These theorems lead to a reconstruction of the geometry that constituted the discussion's starting point, within algebraic structures such as the endomorphism ring of the underlying manifold or the full linear group.
Restricted to topics of an algebraic nature, the text shows how far purely algebraic methods may extend. It assumes only a familiarity with the basic concepts and terms of algebra. The methods of transfinite set theory frequently recur, and for readers unfamiliar with this theory, the concepts and principles appear in a special appendix.
Restricted to topics of an algebraic nature, the text shows how far purely algebraic methods may extend. It assumes only a familiarity with the basic concepts and terms of algebra. The methods of transfinite set theory frequently recur, and for readers unfamiliar with this theory, the concepts and principles appear in a special appendix.
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Contenuti
Preface I. Motivation I.1 The Three-Dimensional Affine Space as Prototype of Linear Manifolds I.2 The Real Projective Plane as Prototype of the Lattice of Subspaces of a Linear Manifold II. The Basic Properties of a Linear Manifold II.1 Dedekind's Law and the Principle of Complementation II.2 Linear Dependence and Independence; Rank II.3 The Adjoint Space Appendix I. Application to Systems of Linear Homogeneous Equations Appendix II. Paired Spaces II.4 The Adjunct Space Appendix III. Fano's Postulate III. Projectivities III.1 Representation of Projectivities by Semi-linear Transformations Appendix I. Projective Construction of the Homothetic Group III.2 The Group of Collineations III.3 The Second Fundamental Theorem of Projective Geometry Appendix II. The Theorem of Pappus III.4 The Projective Geometry of a Line in Space; Cross Ratios Appendix III. Projective Ordering of a Space IV. Dualities IV.1 Existence of Dualities; Semi-bilinear Forms IV.2 Null Systems IV.3 Representation of Polarities IV.4 Isotropic and Non-isotropic Subspaces of a Polarity; Index and Nullity Appendix I. Sylvester's Theorem of Inertia Appendix II. Projective Relations between Lines Induced by Polarities Appendix III. The Theorem of Pascal IV.5 The Group of a Polarity Appendix IV. The Polarities with Transitive Group IV.6 The Non-isotropic Subspaces of a Polarity V. The Ring of a Linear Manifold V.1 Definition of the Endomorphism Ring V.2 The Three Cornered Galois Theory V.3 The Finitely Generated Ideals V.4 The Isomorphisms of the Endomorphism Ring V.5 The Anti-isomorphisms of the Endomorphism Ring Appendix I. The Two-sided Ideals of the Endomorphism Ring VI. The Groups of a Linear Manifold VI.1 The Center of the Full Linear Group VI.2 First and Second Centralizer of an Involution VI.3 Transformations of Class 2 VI.4 Cosets of Involutions VI.5 The Isomorphisms of the Full Linear Group Appendix I. Groups of Involutions VI.6 Characterization of the Full Linear Group within the Group of Semi-linear Transformations VI.7 The Isomorphisms of the Group of Semi-linear Transformations VII. Internal Characterization of the System of Subspaces A Short Bibliography of the Principles of Geometry VII.1 Basic Concepts, Postulates and Elementary Properties VII.2 Dependent and Independent Points VII.3 The Theorem of Desargues VII.4 The Imbedding Theorem VII.5 The Group of a Hyperplane VII.6 The Representation Theorem VII.7 The Principles of Affine Geometry Appendix S. A Survey of the Basic Concepts and Principles of the Theory of Sets A Selection of Suitable Introductions into the Theory of Sets Sets and Subsets Mappings Partially Ordered Sets Well Ordering Ordinal Numbers Cardinal Numbers Bibliography Index
Product Description
Geared toward upper-level undergraduates and graduate students, this text establishes that projective geometry and linear algebra are essentially identical. The supporting evidence consists of theorems offering an algebraic demonstration of certain geometric concepts. These theorems lead to a reconstruction of the geometry that constituted the discussion's starting point. 1952 edition.
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Linear Algebra and Projective Geometry (Dover Books on Mathematics)
Editore:
Dover Publications, 2005
ISBN 10: 0486445658
ISBN 13: 9780486445656
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Paperback
Da: ThriftBooks-Atlanta, AUSTELL, GA, U.S.A.
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Paperback. Condizione: Very Good. No Jacket. May have limited writing in cover pages. Pages are unmarked. ~ ThriftBooks: Read More, Spend Less 0.8. Codice articolo G0486445658I4N00
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Foto dell'editore
Linear Algebra and Projective Geometry (Dover Books on Mathematics)
Editore:
Dover Publications, 2005
ISBN 10: 0486445658
ISBN 13: 9780486445656
Antico o usato
Paperback
Da: HPB-Red, Dallas, TX, U.S.A.
Valutazione del venditore 5 su 5 stelle
Paperback. Condizione: Good. Connecting readers with great books since 1972! Used textbooks may not include companion materials such as access codes, etc. May have some wear or writing/highlighting. We ship orders daily and Customer Service is our top priority! Codice articolo S_410110901
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