The direct product of a free group and a polycyclic group is known to be coherent. This paper shows that every finitely generated subsemigroup of the direct product of a virtually free group and an abelian group admits a finite Malcev presentation. (A Malcev presentation is a presentation of a special type for a semigroup that embeds into a group. A group is virtually free if it contains a free subgroup of finite index.) By considering the direct product of two free semigroups, it is also shown that polycyclic groups, unlike nilpotent groups, can contain finitely generated subsemigroups that do not admit finite Malcev presentations. (C) 2008 Elsevier B.V. All rights reserved.</p
Complete presentations provide a natural solution to the word problem in monoids and groups. Here we...
Abstract. We establish virtual surjection to pairs (VSP) as a general criterion for the finite prese...
44 pages. To appear in American Journal of Mathematics. This is a substantial rewrite of our previou...
The direct product of a free group and a polycyclic group is known to be coherent. This paper shows ...
AbstractThe direct product of a free group and a polycyclic group is known to be coherent. This pape...
This paper shows that, given a finite subset X of a finitely generated virtually free group F, the f...
This thesis studies subsemigroups of groups from three perspectives: automatic structures, ordinary ...
AbstractThere exist finitely generated submonoids of a free monoid which are not finitely presented ...
It is known that, for semigroups, the property of admitting a finite presentation is preserved on pa...
It is a classical result that the direct product A × B of two groups is finitely generated (finitely...
The purpose of this paper is to give necessary and sufficient conditions for the direct product of t...
A method for finding presentations for subsemigroups of semigroups defined by presentations is used ...
We establish {\em{virtual surjection to pairs}} (VSP) as a general criterion for the finite presenta...
AbstractWe apply automata-theoretic tools and some recently established compactness properties in th...
Abstract. We establish virtual surjection to pairs (VSP) as a general criterion for the finite prese...
Complete presentations provide a natural solution to the word problem in monoids and groups. Here we...
Abstract. We establish virtual surjection to pairs (VSP) as a general criterion for the finite prese...
44 pages. To appear in American Journal of Mathematics. This is a substantial rewrite of our previou...
The direct product of a free group and a polycyclic group is known to be coherent. This paper shows ...
AbstractThe direct product of a free group and a polycyclic group is known to be coherent. This pape...
This paper shows that, given a finite subset X of a finitely generated virtually free group F, the f...
This thesis studies subsemigroups of groups from three perspectives: automatic structures, ordinary ...
AbstractThere exist finitely generated submonoids of a free monoid which are not finitely presented ...
It is known that, for semigroups, the property of admitting a finite presentation is preserved on pa...
It is a classical result that the direct product A × B of two groups is finitely generated (finitely...
The purpose of this paper is to give necessary and sufficient conditions for the direct product of t...
A method for finding presentations for subsemigroups of semigroups defined by presentations is used ...
We establish {\em{virtual surjection to pairs}} (VSP) as a general criterion for the finite presenta...
AbstractWe apply automata-theoretic tools and some recently established compactness properties in th...
Abstract. We establish virtual surjection to pairs (VSP) as a general criterion for the finite prese...
Complete presentations provide a natural solution to the word problem in monoids and groups. Here we...
Abstract. We establish virtual surjection to pairs (VSP) as a general criterion for the finite prese...
44 pages. To appear in American Journal of Mathematics. This is a substantial rewrite of our previou...