Exteriors of codimension one embeddings of product of three spheres into spheres (2010)
- Autores:
- Autor USP: MANZOLI NETO, OZIRIDE - ICMC
- Unidade: ICMC
- Assuntos: TOPOLOGIA ALGÉBRICA; TOPOLOGIA DIFERENCIAL; TOPOLOGIA GEOMÉTRICA
- Idioma: Inglês
- Imprenta:
- Editora: ICMC-USP
- Local: São Carlos
- Data de publicação: 2010
- Fonte:
- ISSN: 0103-2577
-
ABNT
LUCAS, Laércio Aparecido e MANZOLI NETO, Oziride e SAEKI, Osamu. Exteriors of codimension one embeddings of product of three spheres into spheres. . São Carlos: ICMC-USP. Disponível em: https://repositorio.usp.br/directbitstream/8be93f9a-3824-4120-bfde-7991ef6d6c2e/2131609.pdf. Acesso em: 23 abr. 2024. , 2010 -
APA
Lucas, L. A., Manzoli Neto, O., & Saeki, O. (2010). Exteriors of codimension one embeddings of product of three spheres into spheres. São Carlos: ICMC-USP. Recuperado de https://repositorio.usp.br/directbitstream/8be93f9a-3824-4120-bfde-7991ef6d6c2e/2131609.pdf -
NLM
Lucas LA, Manzoli Neto O, Saeki O. Exteriors of codimension one embeddings of product of three spheres into spheres [Internet]. 2010 ;[citado 2024 abr. 23 ] Available from: https://repositorio.usp.br/directbitstream/8be93f9a-3824-4120-bfde-7991ef6d6c2e/2131609.pdf -
Vancouver
Lucas LA, Manzoli Neto O, Saeki O. Exteriors of codimension one embeddings of product of three spheres into spheres [Internet]. 2010 ;[citado 2024 abr. 23 ] Available from: https://repositorio.usp.br/directbitstream/8be93f9a-3824-4120-bfde-7991ef6d6c2e/2131609.pdf - 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
- 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"
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