| Texto completo | |
| Autor(es): |
Viana Bedoya, Natalia A.
;
Goncalves, Daciberg Lima
;
Kudryavtseva, Elena A.
Número total de Autores: 3
|
| Tipo de documento: | Artigo Científico |
| Fonte: | JOURNAL OF KNOT THEORY AND ITS RAMIFICATIONS; v. 27, n. 5, p. 23-pg., 2018-04-01. |
| Resumo | |
In this work, we study the decomposability property of branched coverings of degree d odd, over the projective plane, where the covering surface has Euler characteristic <= 0. The latter condition is equivalent to say that the defect of the covering is greater than d. We show that, given a datum D = {D-1, ... , D-s} with an even defect greater than d, it is realizable by an indecomposable branched covering over the projective plane. The case when d is even is known. (AU) | |
| Processo FAPESP: | 12/24454-8 - Topologia Algébrica, Geométrica e Diferencial |
| Beneficiário: | Daciberg Lima Gonçalves |
| Modalidade de apoio: | Auxílio à Pesquisa - Temático |