| Autor(es): |
Número total de Autores: 3
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| Afiliação do(s) autor(es): | [1] Univ Estadual Paulista, UNESP, Dept Matemat, Rua Cristovao Colombo 2265, BR-15054000 Sao Jose Do Rio Preto, SP - Brazil
[2] UFSCAR Univ Fed Sao Carlos, Ctr Ciencias Exatas & Tecnol, Dept Estat, Rodovia Washington Luis, Km 235, BR-13565905 Sao Carlos, SP - Brazil
Número total de Afiliações: 2
|
| Tipo de documento: | Artigo Científico |
| Fonte: | ALGEBRA & DISCRETE MATHEMATICS; v. 25, n. 2, p. 177-187, 2018. |
| Citações Web of Science: | 0 |
| Resumo | |
Let G be a group, S = [S-i, i is an element of I] a non empty family of (not necessarily distinct) subgroups of infinite index in G and M a Z(2)G-module. In {[}4] the authors defined a homological invariant E,(G,S,M), which is ``dual{''} to the cohomological invariant E-{*}(G,S, M), defined in {[}1]. In this paper we present a more general treatment of the invariant E-{*}(G, S, M) obtaining results and properties, under a homological point of view, which are dual to those obtained by Andrade and Fanti with the invariant E(G, S, M). We analyze, through the invariant E-{*}(G, S, M), properties about groups that satisfy certain finiteness conditions such as Poincare duality for groups and pairs. (AU) | |
| Processo FAPESP: | 12/24454-8 - Topologia Algébrica, Geométrica e Diferencial |
| Beneficiário: | Daciberg Lima Gonçalves |
| Modalidade de apoio: | Auxílio à Pesquisa - Temático |