Add to ORKGTodd and Coxeter's method for enumerating cosets of finitely generated subgroups in finitely presented groups (abbreviated by Tc here) is one famous method from combinatorial group theory for studying the subgroup problem. Since prefix string rewriting is also an appropriate method to study this problem, prefix string rewriting methods have been compared to Tc. We recall and compare two of them briefly, one by Kuhn and Madlener [4] and one by Sims [15]. A new approach using prefix string rewriting in free groups is derived from the algebraic method presented by Reinert, Mora and Madlener in [14] which directly emulates Tc. It is extended to free monoids and an algebraic characterization for the "cosets" enumerated in this setting is provide...
AbstractWe give a simplified presentation of groups in transformation monoids. We use this presentat...
AbstractThe Todd-Coxeter coset enumeration algorithm is one of the most important tools of computati...
In this thesis a method for the enumeration of generators of modules over Euclidean domains is prese...
Rewriting techniques have been applied successfully to various areas of symbolic computation. Here w...
AbstractCoset enumeration is the principal method for solving the word problem in finitely presented...
AbstractIn this paper we show how string rewriting methods can be applied to give a new method of co...
Coset enumeration, based on the methods described by Todd and Coxeter, is one of the basic tools for...
All non-abelian finite simple groups can be symmetrically generated by involutions. An algorithm whi...
All non-abelian finite simple groups can be symmetrically generated by involutions. An algorithm whi...
AbstractThe Todd-Coxeter coset enumeration method is without any doubt the best known and most used ...
One of the main algorithms of computational group theory is the Todd-Coxeter coset enumeration algor...
A double-coset enumeration algorithm for groups generated by symmetric sets of invo-lutions together...
The concept of an automatic group can be generalized to a group that is automatic with respect to a ...
International audienceWe give a simplified presentation of groups in transformation monoids. We use ...
AbstractThe Todd-Coxeter coset enumeration method is without any doubt the best known and most used ...
AbstractWe give a simplified presentation of groups in transformation monoids. We use this presentat...
AbstractThe Todd-Coxeter coset enumeration algorithm is one of the most important tools of computati...
In this thesis a method for the enumeration of generators of modules over Euclidean domains is prese...
Rewriting techniques have been applied successfully to various areas of symbolic computation. Here w...
AbstractCoset enumeration is the principal method for solving the word problem in finitely presented...
AbstractIn this paper we show how string rewriting methods can be applied to give a new method of co...
Coset enumeration, based on the methods described by Todd and Coxeter, is one of the basic tools for...
All non-abelian finite simple groups can be symmetrically generated by involutions. An algorithm whi...
All non-abelian finite simple groups can be symmetrically generated by involutions. An algorithm whi...
AbstractThe Todd-Coxeter coset enumeration method is without any doubt the best known and most used ...
One of the main algorithms of computational group theory is the Todd-Coxeter coset enumeration algor...
A double-coset enumeration algorithm for groups generated by symmetric sets of invo-lutions together...
The concept of an automatic group can be generalized to a group that is automatic with respect to a ...
International audienceWe give a simplified presentation of groups in transformation monoids. We use ...
AbstractThe Todd-Coxeter coset enumeration method is without any doubt the best known and most used ...
AbstractWe give a simplified presentation of groups in transformation monoids. We use this presentat...
AbstractThe Todd-Coxeter coset enumeration algorithm is one of the most important tools of computati...
In this thesis a method for the enumeration of generators of modules over Euclidean domains is prese...