Decomposability of branched coverings on the projective plane (2008)
- Authors:
- Autor USP: GONCALVES, DACIBERG LIMA - IME
- Unidade: IME
- Assunto: TOPOLOGIA DE DIMENSÃO BAIXA
- Language: Inglês
- Imprenta:
-
ABNT
BEDOYA, Natalia Andrea Viana e GONÇALVES, Daciberg Lima. Decomposability of branched coverings on the projective plane. . São Paulo: IME-USP. Disponível em: https://repositorio.usp.br/directbitstream/15f9a685-15f9-4696-be16-2399ee455701/1710431.pdf. Acesso em: 23 fev. 2026. , 2008 -
APA
Bedoya, N. A. V., & Gonçalves, D. L. (2008). Decomposability of branched coverings on the projective plane. São Paulo: IME-USP. Recuperado de https://repositorio.usp.br/directbitstream/15f9a685-15f9-4696-be16-2399ee455701/1710431.pdf -
NLM
Bedoya NAV, Gonçalves DL. Decomposability of branched coverings on the projective plane [Internet]. 2008 ;[citado 2026 fev. 23 ] Available from: https://repositorio.usp.br/directbitstream/15f9a685-15f9-4696-be16-2399ee455701/1710431.pdf -
Vancouver
Bedoya NAV, Gonçalves DL. Decomposability of branched coverings on the projective plane [Internet]. 2008 ;[citado 2026 fev. 23 ] Available from: https://repositorio.usp.br/directbitstream/15f9a685-15f9-4696-be16-2399ee455701/1710431.pdf - Reidemeister spectrum for metabelian groups of the form Qn⋊Z and Z[1/p]n⋊Z, p prime
- Wecken homotopies
- Sigma theory and twisted conjugacy, II: Houghton groups and pure symmetric automorphism groups
- Nielsen numbers of selfmaps of flat 3-manifolds
- Minimizing roots of maps between spheres and projective spaces in codimension one
- On automorphisms of split metacyclic groups
- The lower central and derived series of the braid groups of the finitely-punctured sphere
- The lower central and derived series of the braid groups of the sphere
- The collection of papers in this issue were gathered in the aftermath of the “International conference on Nielsen fixed point theory and related topics” [Preface]
- Coincidence Wecken homotopies versus Wecken homotopies relative to a fixed homotopy in one of the maps II
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