Add to ORKGIn 1985, Dunwoody showed that finitely presentable groups are accessible. Dunwoody's result was used to show that context-free groups, groups quasi-isometric to trees or finitely presentable groups of asymptotic dimension 1 are virtually free. Using another theorem of Dunwoody of 1979, we study when a group is virtually free in terms of its Cayley graph and we obtain new proofs of the mentioned results and other previously depending on them<br/
AbstractWhen does the Cayley graph of a finitely generated, infinite group look similar to a tree? F...
The conjugacy problem and the inverse conjugacy problem of a finitely generated group are defined, f...
In this paper, we prove that certain spaces are not quasi-isometric to Cayley graphs of nitely gener...
A geometrical characterization of the Cayley graphs of certain presentations of virtually free and p...
We prove that a finitely generated group is context-free whenever its Cayleygraph has a decidable mo...
This paper shows that, given a finite subset X of a finitely generated virtually free group F, the f...
This paper shows that, given a finite subset X of a finitely generated virtually free group F, the f...
AbstractThis is a continuation of the study, begun by Ceccherini-Silberstein and Woess (2009) [5], o...
81 pages.We give a complete classification of finitely generated virtually free groups up to $\foral...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
AbstractIt is shown that Dunwoody's proof of the accessibility of almost finitely presented groups e...
AbstractWhen does the Cayley graph of a finitely generated, infinite group look similar to a tree? F...
The conjugacy problem and the inverse conjugacy problem of a finitely generated group are defined, f...
In this paper, we prove that certain spaces are not quasi-isometric to Cayley graphs of nitely gener...
A geometrical characterization of the Cayley graphs of certain presentations of virtually free and p...
We prove that a finitely generated group is context-free whenever its Cayleygraph has a decidable mo...
This paper shows that, given a finite subset X of a finitely generated virtually free group F, the f...
This paper shows that, given a finite subset X of a finitely generated virtually free group F, the f...
AbstractThis is a continuation of the study, begun by Ceccherini-Silberstein and Woess (2009) [5], o...
81 pages.We give a complete classification of finitely generated virtually free groups up to $\foral...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
AbstractIt is shown that Dunwoody's proof of the accessibility of almost finitely presented groups e...
AbstractWhen does the Cayley graph of a finitely generated, infinite group look similar to a tree? F...
The conjugacy problem and the inverse conjugacy problem of a finitely generated group are defined, f...
In this paper, we prove that certain spaces are not quasi-isometric to Cayley graphs of nitely gener...