Add to ORKGlast updated 9/12/2011 In geometric group theory one uses group actions on spaces to gain information about groups. One natural space to use is the Cayley graph of a group. The Cayley graph arguments that one encounters tend to require local finiteness, and hence finite generation of the group. In this paper, I take the theory of intersections of splittings of finitely generated groups (as developed by Scott, Scott-Swarup, and Niblo-Sageev-Scott-Swarup), and rework it to remove finite generation assumptions. Whereas the aforementioned authors relied o
Abstract: We give a nonstandard treatment of the notion of ends of proper geodesic metric spaces. We...
International audienceWe show that every finitely generated group G with an element of order at leas...
This thesis is concerned with some asymptotic and geometric properties of finite groups. We shall pr...
In geometric group theory one uses group actions on spaces to gain information about groups. One nat...
It is known that splittings of one-ended finitely presented groups over 2-ended groups can be chara...
AbstractIn this short note the neighbourhood graph of a Cayley graph is considered. It has, as nodes...
In this short note the neighbourhood graph of a Cayley graph is considered. It has as nodes a symmet...
We prove that in a certain statistical sense the Cayley graph of almost every finitely presented gro...
Theory. The primary goal in this field is the study of finitely generated, infinite discrete groups....
AbstractIt is well known that the triviality problem for finitely presented groups is unsolvable; we...
AbstractGiven a finitely generated semigroup S and subsemigroup T of S, we define the notion of the ...
Geometric group theory is a relatively new branch of mathematics, studied as a distinct area since t...
AbstractWe study an obstruction to splitting a finitely generated group G as an amalgamated free pro...
We describe a means of constructing splittings of a one-ended finitely generated group over two-ende...
9 pagesInternational audienceIf $G$ is a group and $S$ a generating set, $G$ canonically embeds into...
Abstract: We give a nonstandard treatment of the notion of ends of proper geodesic metric spaces. We...
International audienceWe show that every finitely generated group G with an element of order at leas...
This thesis is concerned with some asymptotic and geometric properties of finite groups. We shall pr...
In geometric group theory one uses group actions on spaces to gain information about groups. One nat...
It is known that splittings of one-ended finitely presented groups over 2-ended groups can be chara...
AbstractIn this short note the neighbourhood graph of a Cayley graph is considered. It has, as nodes...
In this short note the neighbourhood graph of a Cayley graph is considered. It has as nodes a symmet...
We prove that in a certain statistical sense the Cayley graph of almost every finitely presented gro...
Theory. The primary goal in this field is the study of finitely generated, infinite discrete groups....
AbstractIt is well known that the triviality problem for finitely presented groups is unsolvable; we...
AbstractGiven a finitely generated semigroup S and subsemigroup T of S, we define the notion of the ...
Geometric group theory is a relatively new branch of mathematics, studied as a distinct area since t...
AbstractWe study an obstruction to splitting a finitely generated group G as an amalgamated free pro...
We describe a means of constructing splittings of a one-ended finitely generated group over two-ende...
9 pagesInternational audienceIf $G$ is a group and $S$ a generating set, $G$ canonically embeds into...
Abstract: We give a nonstandard treatment of the notion of ends of proper geodesic metric spaces. We...
International audienceWe show that every finitely generated group G with an element of order at leas...
This thesis is concerned with some asymptotic and geometric properties of finite groups. We shall pr...