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幾何基礎(chǔ)

作者:David
出版社:高等教育出版社出版時(shí)間:2023-06-01
開(kāi)本: 16開(kāi) 頁(yè)數(shù): 135
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《幾何基礎(chǔ)》是數(shù)學(xué)大師希爾伯特的一部名著,首次發(fā)表于1899年,該書(shū)**次給出了完備的歐幾里得幾何公理系統(tǒng)。全體公理按性質(zhì)分為五組(即關(guān)聯(lián)公理、次序公理、合同公理、平行公理和連續(xù)公理),他對(duì)它們之間的邏輯關(guān)系作了深刻的考察,精確地提出了公理系統(tǒng)的相容性、獨(dú)立性與完備性要求。為解決獨(dú)立性問(wèn)題,他的典型方法是構(gòu)作一個(gè)模型,不滿(mǎn)足所論的公理,但卻滿(mǎn)足所有其他公理。采用這種途徑可賦予非歐幾何以嚴(yán)密的邏輯解釋?zhuān)瑫r(shí)開(kāi)拓了建立其他新幾何學(xué)的可能性。對(duì)于相容性問(wèn)題,他的重大貢獻(xiàn)是借助于解析幾何而將歐氏幾何的相容性歸結(jié)為初等算術(shù)的相容性。上述工作的意義遠(yuǎn)超出了幾何基礎(chǔ)的范圍,而使他成為現(xiàn)代公理化方法的奠基人。

幾何基礎(chǔ) 目錄

INTRODUCTION CHAPTER Ⅰ THE FIVE GROUPS OF AXIOMS §1.The elements of geometry and the five groups of axioms §2.Group I.Axioms of connection §3.Group II.Axioms of order §4.Consequences of the axioms of connection and order §5.Group III.Axiom of parallels (Euclid's axiom) §6.Group IV.Axioms of congruence §7.Consequences of the axioms of congruence §8.Group V.Axiom of continuity (Archimedes's axiom) CHAPTER Ⅱ COMPATIBILITY AND MUTUAL INDEPENDENCE OF THE AXIOMS §9.Compatibility of the axioms §10.Independence of the axioms of parallels (Non-euclidean geom-etry) §11.Independence of the axioms of congruence §12.Independence of the axiom of continuity (Non-archimedean geometry) CHAPTER Ⅲ THE THEORY OF PROPORTION §13.Complex number systems §14.Demonstration of Pascal's theorem §15.An algebra of segments, based upon Pascal's theorem §16.Proportion and the theorems of similitude §17.Equations of straight lines and of planes CHAPTER Ⅳ THE THEORY OF PLANE AREAS §18.Equal area and equal content of polygons §19.Parallelograms and triangles having equal bases and equal al-titudes §20.The measure of area of triangles and polygons §21.Equality of content and the measure of area CHAPTER Ⅴ DESARGUES'S THEOREM §22.Desargues's theorem and its demonstration for plane geometry by aid of the axioms of congruence §23.The impossibility of demonstrating Desargues's theorem for the plane without the help of the axioms of congruence §24.Introduction of an algebra of segments based upon Desargues's theorem and independent of the axioms of congruence §25.The commutative and the associative law of addition for our new algebra of segments §26.The associative law of multiplication and the two distributive laws for the new algebra of segments §27.Equation of the straight line, based upon the new algebra of segments §28.The totality of segments, regarded as a complex number sys-tem §29.Construction of a geometry of space by aid of a desarguesian number system §30.Significance of Desargues's theorem CHAPTER Ⅵ PASCAL'S THEOREM §31.Two theorems concerning the possibility of proving Pascal's theorem §32.The commutative law of multiplication for an archimedean number system §33.The commutative law of multiplication for a non-archimedean number system §34.Proof of the two propositions concerning Pascal's theorem (Non-pascalian geometry) §35.The demonstration, by means of the theorems of Pascal and Desargues, of any theorem relating to points of intersection CHAPTER Ⅶ GEOMETRICAL CONSTRUCTIONS BASED UPON THE AXIOMS I-V §36.Geometrical constructions by means of a straight-edge and a transferer of segments §37.Analytical representation of the co-ordinates of points which can be so constructed §38.The representation of algebraic numbers and of integral rational functions as sums of squares §39.Criterion for the possibility of a geometrical construction by means of a straight-edge and a transferer of segments CONCLUSION APPENDIX
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