A generalization of Alexander's Torus theorem to higher dimensions and an unknotting theorem for "S POT. P" x "S POT. Q" embedded in "S POT. P+Q+2" (1996)
- Authors:
- Autor USP: MANZOLI NETO, OZIRIDE - ICMC
- Unidade: ICMC
- Assunto: TOPOLOGIA
- Language: Inglês
- Source:
- Título do periódico: Kobe Journal of Mathematics
- Volume/Número/Paginação/Ano: v. 13, n. 2, p. 145-165, 1996
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ABNT
LUCAS, Laércio Aparecido e MANZOLI NETO, Oziride e SAEKI, Osamu. A generalization of Alexander's Torus theorem to higher dimensions and an unknotting theorem for "S POT. P" x "S POT. Q" embedded in "S POT. P+Q+2". Kobe Journal of Mathematics, v. 13, n. 2, p. 145-165, 1996Tradução . . Acesso em: 19 abr. 2024. -
APA
Lucas, L. A., Manzoli Neto, O., & Saeki, O. (1996). A generalization of Alexander's Torus theorem to higher dimensions and an unknotting theorem for "S POT. P" x "S POT. Q" embedded in "S POT. P+Q+2". Kobe Journal of Mathematics, 13( 2), 145-165. -
NLM
Lucas LA, Manzoli Neto O, Saeki O. A generalization of Alexander's Torus theorem to higher dimensions and an unknotting theorem for "S POT. P" x "S POT. Q" embedded in "S POT. P+Q+2". Kobe Journal of Mathematics. 1996 ; 13( 2): 145-165.[citado 2024 abr. 19 ] -
Vancouver
Lucas LA, Manzoli Neto O, Saeki O. A generalization of Alexander's Torus theorem to higher dimensions and an unknotting theorem for "S POT. P" x "S POT. Q" embedded in "S POT. P+Q+2". Kobe Journal of Mathematics. 1996 ; 13( 2): 145-165.[citado 2024 abr. 19 ] - Strong surjectivity of maps from 2-complexes into the 2-sphere
- On the variations of the Betti numbers of regular levels of Morse flows
- The construction of fundamental domain of tetrahedral spherical space forms
- Unknotting theorem for 'S POT.O'x'S POT.Q' embeddedin 'S POT.P+Q+2'
- Total linking number modules
- Aplicacoes do grupo fundamental
- A Wecken type theorem for the absolute degree and proper maps
- Representing homotopy classes by maps with certain minimality root properties
- Representing homotopy classes by maps with certain minimality root properties II
- Exteriors of codimension one embeddings of product of three spheres into spheres
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