Adachi, Masahisa, Embeddings and immersions, 1993 [2013-09-29], ISBN 978-0-8218-4612-4, (原始内容于2013-11-26), translation Kiki Hudson
Arnold, V. I.; Varchenko, A. N.; Gusein-Zade, S. M., Singularities of Differentiable Maps: Volume 1, Birkhäuser, 1985, ISBN 0-8176-3187-9
Bruce, J. W.; Giblin, P. J., Curves and Singularities, Cambridge University Press, 1984, ISBN 0-521-42999-4
Carter, J. Scott; Saito, Masahico, Surfaces in 3-Space That Do Not Lift to Embeddings in 4-Space, 1995 [2013-09-29], (原始内容于2016-03-04)published in conference proceedings Knot theory, Banach center publications, 42 Warzawa (1998), 29–47.
Carter, J. Scott; Saito, Masahico, Knotted Surfaces and Their Diagrams, Mathematical Surveys and Monographs 55: 258, 1998, ISBN 978-0-8218-0593-0
Carter, J. Scott; Kamada, Seiichi; Saito, Masahico, Surfaces in 4-space, 2004
Gromov, M., Partial differential relations, Springer, 1986, ISBN 3-540-12177-3
Hirsch M. Immersions of manifolds. Trans. A.M.S. 93 1959 242—276.
Koschorke, Ulrich, Multiple points of Immersions and the Kahn-Priddy Theorem, Math Z., 1979, (169): 223–236
Smale, S. A classification of immersions of the two-sphere. Trans. Amer. Math. Soc. 90 1958 281–290.
Smale, S. The classification of immersions of spheres in Euclidean spaces. Ann. of Math. (2) 69 1959 327—344.
Spring, D., The Golden Age of Immersion Theory in Topology: 1959-1973 (PDF), Bulletin of the American Mathematical Society, 2005, (42): 163–180 [2013-09-29], (原始内容 (PDF)于2008-07-25)
Wall, C. T. C.: Surgery on compact manifolds. 2nd ed., Mathematical Surveys and Monographs 69, A.M.S.
Immersion of a manifold (页面存档备份,存于互联网档案馆) at the Encyclopedia of Mathematics
十二月 13, 2023
浸入, 數學上, 是微分流形之間的可微映射, 其導數處處是單射, 確切而言, n是, 若在m中每一點p, 克萊因瓶到3, 空間中, displaystyle, 都是单射, tpx表示x在點p處的切空間, 另一個等價說法是f是, 若f的秩是常數, 且等於m的維數, rank, displaystyle, operatorname, rank, 以上只要求f的導數為單射, 但映射f未必是單射, 一個與相關的概念是嵌入, 光滑嵌入是一個單射f, n而同時為拓撲嵌入, 使得m與其在n中的像微分同胚, 正是局部嵌入, 即對m. 數學上 浸入是微分流形之間的可微映射 其導數處處是單射 確切而言 f M N是浸入 若在M中每一點p 克萊因瓶浸入到3 空間中 D p f T p M T f p N displaystyle D p f T p M to T f p N 都是单射 TpX表示X在點p處的切空間 另一個等價說法是f是浸入 若f的秩是常數 且等於M的維數 rank D p f dim M displaystyle operatorname rank D p f dim M 以上只要求f的導數為單射 但映射f未必是單射 一個與浸入相關的概念是嵌入 光滑嵌入是一個單射浸入f M N而同時為拓撲嵌入 使得M與其在N中的像微分同胚 浸入正是局部嵌入 即對M中每一點x都有一個x的鄰域U M 使得f U N是嵌入 相反地 局部嵌入都是浸入 一個單射浸入子流形而不是嵌入 若M是緊緻的 則單射浸入是一個嵌入 若M不是緊緻 則未必成立 這兩者的關係就如同連續雙射之於同胚 參考 编辑Adachi Masahisa Embeddings and immersions 1993 2013 09 29 ISBN 978 0 8218 4612 4 原始内容存档于2013 11 26 translation Kiki Hudson Arnold V I Varchenko A N Gusein Zade S M Singularities of Differentiable Maps Volume 1 Birkhauser 1985 ISBN 0 8176 3187 9 Bruce J W Giblin P J Curves and Singularities Cambridge University Press 1984 ISBN 0 521 42999 4 Carter J Scott Saito Masahico Surfaces in 3 Space That Do Not Lift to Embeddings in 4 Space 1995 2013 09 29 原始内容存档于2016 03 04 published in conference proceedings Knot theory Banach center publications 42 Warzawa 1998 29 47 Carter J Scott Saito Masahico Knotted Surfaces and Their Diagrams Mathematical Surveys and Monographs 55 258 1998 ISBN 978 0 8218 0593 0 Carter J Scott Kamada Seiichi Saito Masahico Surfaces in 4 space 2004 Gromov M Partial differential relations Springer 1986 ISBN 3 540 12177 3 Hirsch M Immersions of manifolds Trans A M S 93 1959 242 276 Koschorke Ulrich Multiple points of Immersions and the Kahn Priddy Theorem Math Z 1979 169 223 236 Smale S A classification of immersions of the two sphere Trans Amer Math Soc 90 1958 281 290 Smale S The classification of immersions of spheres in Euclidean spaces Ann of Math 2 69 1959 327 344 Spring D The Golden Age of Immersion Theory in Topology 1959 1973 PDF Bulletin of the American Mathematical Society 2005 42 163 180 2013 09 29 原始内容存档 PDF 于2008 07 25 Wall C T C Surgery on compact manifolds 2nd ed Mathematical Surveys and Monographs 69 A M S 外部連結 编辑Immersion 页面存档备份 存于互联网档案馆 at the Manifold Atlas Immersion of a manifold 页面存档备份 存于互联网档案馆 at the Encyclopedia of Mathematics 取自 https zh wikipedia org w index php title 浸入 amp oldid 69571067, 维基百科,wiki,书籍,书籍,图书馆,
