Some properties of E(G,W,F_TG) and an application in the theory of splittings of groups
-
Published:2020
Issue:2
Volume:30
Page:179-193
-
ISSN:1726-3255
-
Container-title:Algebra and Discrete Mathematics
-
language:
-
Short-container-title:ADM
Author:
Fanti E. L. C., ,Silva L. S.,
Abstract
Let us consider W a G-set and M a Z2G-module, where G is a group. In this paper we investigate some properties of the cohomological the theory of splittings of groups. Namely, we give a proof of the invariant E(G,W,M), defined in [5] and present related results with independence of E(G,W,M) with respect to the set of G-orbit representatives in W and properties of the invariant E(G,W,FTG) establishing a relation with the end of pairs of groups e˜(G,T), defined by Kropphller and Holler in [15]. The main results give necessary conditions for G to split over a subgroup T, in the cases where M=Z2(G/T) or M=FTG.
Publisher
State University Luhansk Taras Shevchenko National University
Subject
Discrete Mathematics and Combinatorics,Algebra and Number Theory