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Stein ½ÏеÄÑо¿Éú¼¶±ðµÄµ¥±äÁ¿¸´·ÖÎö½Ì²Ä 7¡¢Lang, Real and Functional analysis Ñо¿Éú¼¶±ðµÄ·ÖÎö²Î¿¼Êé 8¡¢ Royden, Real analysis ±ê×¼µÄÑо¿ÉúÒ»Ä꼶ʵ·ÖÎö½Ì²Ä 9¡¢ Folland, Real analysis ±ê×¼µÄÑо¿ÉúÒ»Ä꼶ʵ·ÖÎö½Ì²Ä µÚ¶þѧÄê Ç^ѧÆÚ ´º¼¾Ñ§ÆÚ ´úÊýIII ´úÊýIV 1¡¢ Commutative ring theory, by H. Matsumura ½ÏеÄÑо¿Éú½»»»´úÊý±ê×¼½Ì²Ä 2¡¢ Commutative Algebra I&II by Oscar Zariski , Pierre Samuel ¾µäµÄ½»»»´úÊý²Î¿¼Êé 3¡¢ An introduction to Commutative Algebra by Atiyah ±ê×¼µÄ½»»»´úÊýÈëÃÅ½Ì²Ä 4¡¢An introduction to homological algebra ,by weibel ½ÏеÄÑо¿Éú¶þÄ꼶ͬµ÷´úÊý½Ì²Ä 5¡¢A Course in Homological Algebra by P.J.Hilton,U.Stammbach ¾µäÈ«ÃæµÄͬµ÷´úÊý²Î¿¼Êé 6¡¢ Homological Algebra by Cartan ¾µäµÄͬµ÷´úÊý²Î¿¼Êé 7¡¢ Methods of Homological Algebra by Sergei I. Gelfand, Yuri I. Manin ¸ß¼¶¡¢¾µäµÄͬµ÷´úÊý²Î¿¼Êé 8¡¢ Homology by Saunders Mac Lane ¾µäµÄͬµ÷´úÊýϵͳ½éÉÜ 9¡¢Commutative Algebra with a view toward Algebraic Geometry by Eisenbud ¸ß¼¶µÄ´úÊý¼¸ºÎ¡¢½»»»´úÊýµÄ²Î¿¼Ê飬×îеĽ»»»´úÊýÈ«Ãæ²Î¿¼ ´úÊýÍØÆË I ´úÊýÍØÆË II 1¡¢ Algebraic Topology, A. Hatcher ×îеÄÑо¿Éú´úÊýÍØÆ˱ê×¼½Ì²Ä 2¡¢ Spaniers "Algebraic Topology" ¾µäµÄ´úÊýÍØÆ˲ο¼Êé 3¡¢ Differential forms in algebraic topology, by Raoul Bott and Loring W. Tu Ñо¿Éú´úÊýÍØÆ˱ê×¼½Ì²Ä 4¡¢ Massey, A basic course in Algebraic topology ¾µäµÄÑо¿Éú´úÊýÍØÆË½Ì²Ä 5¡¢ Fulton , Algebraic topology£ºa first course ºÜºÃ±¾¿ÆÉú¸ßÄ꼶ºÍÑо¿ÉúÒ»Ä꼶µÄ´úÊýÍØÆ˲ο¼Êé 6¡¢Glen Bredon, Topology and geometry ±ê×¼µÄÑо¿Éú´úÊýÍØÆ˽̲ģ¬ÓÐÏ൱ƪ·ù½²Êö¹â»¬Á÷ÐÎ 7¡¢ Algebraic Topology Homology and Homotopy ¸ß¼¶¡¢¾µäµÄ´úÊýÍØÆ˲ο¼Êé 8¡¢A Concise Course in Algebraic Topology by J.P.May Ñо¿Éú´úÊýÍØÆ˵ÄÈëÃŽ̲ģ¬¸²¸Ç·¶Î§½Ï¹ã 9¡¢ Elements of Homotopy Theory by G.W. Whitehead ¸ß¼¶¡¢¾µäµÄ´úÊýÍØÆ˲ο¼Êé ʵ·ÖÎö II ·ºº¯·ÖÎö 1¡¢ Royden, Real analysis ±ê×¼Ñо¿Éú·ÖÎö½Ì²Ä 2¡¢ Walter Rudin, Real and complex analysis ±ê×¼Ñо¿Éú·ÖÎö½Ì²Ä 3¡¢ Halmos£¬"Measure Theory" ¾µäµÄÑо¿Éúʵ·ÖÎö½Ì²Ä£¬ÊʺÏ×÷²Î¿¼Êé 4¡¢ Walter Rudin, Functional analysis ±ê×¼µÄÑо¿Éú·ºº¯·ÖÎö½Ì²Ä 5¡¢ Conway,A course of Functional analysis ±ê×¼µÄÑо¿Éú·ºº¯·ÖÎö½Ì²Ä 6¡¢ Folland, Real analysis ±ê×¼Ñо¿Éúʵ·ÖÎö½Ì²Ä 7¡¢ Functional Analysis by Lax ¸ß¼¶µÄÑо¿Éú·ºº¯·ÖÎö½Ì²Ä 8¡¢ Functional Analysis by Yoshida ¸ß¼¶µÄÑо¿Éú·ºº¯·ÖÎö²Î¿¼Êé 9¡¢ Measure Theory, Donald L. Cohn ¾µäµÄ²â¶ÈÂ۲ο¼Êé ΢·ÖÍØÆË ÀîȺ¡¢Àî´úÊý 1¡¢ Hirsch, Differential topology ±ê×¼µÄÑо¿Éú΢·ÖÍØÆ˽̲ģ¬ÓÐÏ൱ÄÑ¶È 2¡¢ Lang, Differential and Riemannian manifolds Ñо¿Éú΢·ÖÁ÷ÐεIJο¼Ê飬ÄÑ¶È½Ï¸ß 3¡¢ Warner,Foundations of Differentiable manifolds and Lie groups ±ê×¼µÄÑо¿Éú΢·ÖÁ÷Ðν̲ģ¬ÓÐÏ൱µÄƪ·ù½²ÊöÀîȺ 4¡¢ Representation theory: a first course, by W. Fulton and J. Harris ÀîȺ¼°Æä±íʾÂ۵ıê×¼½Ì²Ä 5¡¢ Lie groups and algebraic groups, by A. L. Onishchik, E. B. Vinberg ÀîȺµÄ²Î¿¼Êé 6¡¢ Lectures on Lie Groups W.Y.Hsiang ÀîȺµÄ²Î¿¼Êé 7¡¢ Introduction to Smooth Manifolds by John M. Lee ½ÏеĹØÓڹ⻬Á÷Ðεıê×¼½Ì²Ä 8¡¢ Lie Groups, Lie Algebras, and Their Representation by V.S. Varadarajan ×îÖØÒªµÄÀîȺ¡¢Àî´úÊý²Î¿¼Êé 9¡¢ Humphreys, Introduction to Lie Algebras and Representation Theory , Springer-Verlag, GTM-9 ±ê×¼µÄÀî´úÊýÈëÃÅ½Ì²Ä µÚÈýѧÄê Ç^ѧÆÚ ´º¼¾Ñ§ÆÚ Î¢·Ö¼¸ºÎ I ΢·Ö¼¸ºÎ II 1¡¢ Peter Petersen, Riemannian Geometry ±ê×¼µÄÀèÂü¼¸ºÎ½Ì²Ä 2¡¢ Riemannian Manifolds: An Introduction to Curvature by John M. Lee ×îеÄÀèÂü¼¸ºÎ½Ì²Ä 3¡¢ doCarmo, Riemannian Geometry. ±ê×¼µÄÀèÂü¼¸ºÎ½Ì²Ä 4¡¢M. Spivak, A Comprehensive Introduction to Differential Geometry I¡ªV È«ÃæµÄ΢·Ö¼¸ºÎ¾µä£¬ÊʺÏ×÷²Î¿¼Êé 5¡¢Helgason , Differential Geometry,Lie groups,and symmetric spaces ±ê×¼µÄ΢·Ö¼¸ºÎ½Ì²Ä 6¡¢ Lang, Fundamentals of Differential Geometry ×îеÄ΢·Ö¼¸ºÎ½Ì²Ä£¬ºÜÊʺÏ×÷²Î¿¼Êé 7¡¢ kobayashi/nomizu, Foundations of Differential Geometry ¾µäµÄ΢·Ö¼¸ºÎ²Î¿¼Êé 8¡¢ Boothby,Introduction to Differentiable manifolds and Riemannian Geometry ±ê×¼µÄ΢·Ö¼¸ºÎÈëÃŽ̲ģ¬Ö÷Òª½²Êö΢·ÖÁ÷ÐÎ 9¡¢ Riemannian Geometry I.Chavel ¾µäµÄÀèÂü¼¸ºÎ²Î¿¼Êé 10¡¢ Dubrovin, Fomenko, Novikov ¡°Modern geometry-methods and applications¡±Vol 1¡ª3 ¾µäµÄÏÖ´ú¼¸ºÎѧ²Î¿¼Êé ´úÊý¼¸ºÎ I ´úÊý¼¸ºÎ II 1¡¢ Harris,Algebraic Geometry: a first course ´úÊý¼¸ºÎµÄÈëÃÅ½Ì²Ä 2¡¢ Algebraic Geometry Robin Hartshorne ¾µäµÄ´úÊý¼¸ºÎ½Ì²Ä£¬ÄÑ¶ÈºÜ¸ß 3¡¢Basic Algebraic Geometry 1&2 2nd ed. I.R.Shafarevich. ·Ç³£ºÃµÄ´úÊý¼¸ºÎÈëÃÅ½Ì²Ä 4¡¢ Principles of Algebraic Geometry by giffiths/harris È«Ãæ¡¢¾µäµÄ´úÊý¼¸ºÎ²Î¿¼Ê飬ƫ¸´´úÊý¼¸ºÎ 5¡¢ Commutative Algebra with a view toward Algebraic Geometry by Eisenbud ¸ß¼¶µÄ´úÊý¼¸ºÎ¡¢½»»»´úÊýµÄ²Î¿¼Ê飬×îеĽ»»»´úÊýÈ«Ãæ²Î¿¼ 6¡¢ The Geometry of Schemes by Eisenbud ºÜºÃµÄÑо¿Éú´úÊý¼¸ºÎÈëÃÅ½Ì²Ä 7¡¢ The Red Book of Varieties and Schemes by Mumford ±ê×¼µÄÑо¿Éú´úÊý¼¸ºÎÈëÃÅ½Ì²Ä 8¡¢ Algebraic Geometry I : Complex Projective Varieties by David Mumford ¸´´úÊý¼¸ºÎµÄ¾µä µ÷ºÍ·ÖÎö ƫ΢·Ö·½³Ì 1¡¢ An Introduction to Harmonic Analysis,Third Edition Yitzhak Katznelson µ÷ºÍ·ÖÎöµÄ±ê×¼½Ì²Ä£¬ºÜ¾µä 2¡¢ Evans, Partial differential equations ƫ΢·Ö·½³ÌµÄ¾µä½Ì²Ä 3¡¢ Aleksei.A.Dezin£¬Partial differential equations£¬Springer-Verlag ƫ΢·Ö·½³ÌµÄ²Î¿¼Êé 4¡¢L. Hormander "Linear Partial Differential Operators, " I&II ƫ΢·Ö·½³ÌµÄ¾µä²Î¿¼Êé 5¡¢A Course in Abstract Harmonic Analysis by Folland ¸ß¼¶µÄÑо¿Éúµ÷ºÍ·ÖÎö½Ì²Ä 6¡¢ Abstract Harmonic Analysis by Ross Hewitt ³éÏóµ÷ºÍ·ÖÎöµÄ¾µä²Î¿¼Êé 7¡¢ Harmonic Analysis by Elias M. Stein ±ê×¼µÄÑо¿Éúµ÷ºÍ·ÖÎö½Ì²Ä 8¡¢ Elliptic Partial Differential Equations of Second Order by David Gilbarg ƫ΢·Ö·½³ÌµÄ¾µä²Î¿¼Êé 9¡¢ Partial Differential Equations £¬by Jeffrey Rauch ±ê×¼µÄÑо¿Éúƫ΢·Ö·½³Ì½Ì²Ä ¸´·ÖÎö II ¶à¸´·ÖÎöµ¼ÂÛ 1¡¢ Functions of One Complex Variable II£¬J.B.Conway µ¥¸´±äµÄ¾µä½Ì²Ä£¬µÚ¶þ¾í½ÏÉîÈë 2¡¢Lectures on Riemann Surfaces O.Forster ÀèÂüÇúÃæµÄ²Î¿¼Êé 3¡¢Compact riemann surfaces Jost ÀèÂüÇúÃæµÄ²Î¿¼Êé 4¡¢Compact riemann surfaces Narasimhan ÀèÂüÇúÃæµÄ²Î¿¼Êé 5¡¢Hormander " An introduction to Complex Analysis in Several Variables" ¶à¸´±äµÄ±ê×¼ÈëÃÅ½Ì²Ä 6¡¢ Riemann surfaces , Lang ÀèÂüÇúÃæµÄ²Î¿¼Êé 7¡¢ Riemann Surfaces by Hershel M. Farkas ±ê×¼µÄÑо¿ÉúÀèÂüÇúÃæ½Ì²Ä 8¡¢ Function Theory of Several Complex Variables by Steven G. Krantz ¸ß¼¶µÄÑо¿Éú¶à¸´±ä²Î¿¼Êé 9¡¢ Complex Analysis: The Geometric Viewpoint by Steven G. Krantz ¸ß¼¶µÄÑо¿Éú¸´·ÖÎö²Î¿¼Êé רҵ·½ÏòÑ¡Ð޿Σº 1¡¢¶à¸´·ÖÎö 2¡¢¸´¼¸ºÎ 3¡¢¼¸ºÎ·ÖÎö 4¡¢³éÏóµ÷ºÍ·ÖÎö 5¡¢´úÊý¼¸ºÎ 6¡¢´úÊýÊýÂÛ 7¡¢Î¢·Ö¼¸ºÎ 8¡¢´úÊýȺ¡¢Àî´úÊýÓëÁ¿×ÓȺ 9¡¢·ºº¯·ÖÎöÓëËã×Ó´úÊý 10¡¢ÊýѧÎïÀí 11¡¢¸ÅÂÊÀíÂÛ 12¡¢¶¯Á¦ÏµÍ³Óë±éÀúÀíÂÛ 13¡¢·º´úÊý *Êýѧ»ù´¡£º 1¡¢ halmos ,native set theory 2¡¢ fraenkel ,abstract set theory 3¡¢ ebbinghaus ,mathematical logic 4¡¢ enderton ,a mathematical introduction to logic 5¡¢ landau, foundations of analysis 6¡¢ maclane ,categories for working mathematican Ó¦¸ÃÔÚºËÐĿγÌѧϰµÄ¹ý³ÌÖд©²åÑ¡ÐÞ ¼ÙÉè±¾¿ÆÓ¦ÓеÄˮƽ ·ÖÎö Walter Rudin, Principles of mathematical analysis Apostol , mathematical analysis M.spivak , calculus on manifolds Munknes ,analysis on manifolds Kolmogorov/fomin , introductory real analysis Arnold ,ordinary differential equations ´úÊý£º linear algebra by Stephen H. Friedberg linear algebra by hoffman linear algebra done right by Axler advanced linear algebra by Roman algebra ,artin a first course in abstract algebra by rotman ¼¸ºÎ£º do carmo, differential geometry of curves and surfaces Differential topology by Pollack Hilbert ,foundations of geometry James R. Munkres, Topology [ Last edited by laizuliang on 2007-10-31 at 14:37 ] |
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