The Whitehead minimization problem consists in finding a minimum size element in the automorphic orbit of a word, a cyclic word or a finitely generated subgroup in a finite rank free group. We give the first fully polynomial algorithm to solve this problem, that is, an algorithm that is polynomial both in the length of the input word and in the rank of the free group. Earlier algorithms had an exponential dependency in the rank of the free group. It follows that the primitivity problem – to decide whether a word is an element of some basis of the free group – and the free factor problem can also be solved in polynomial time
We solve the Whitehead problem for automorphisms, monomor-phisms and endomorphisms in Zm ˆ Fn after ...
Abstract. We examine the relationship between the complexity of the word problem for a presentation ...
AbstractThe relative complexity of the following problems on abelian groups represented by an explic...
The Whitehead minimization problem consists in finding a minimum size element in the automorphic orb...
In this paper we discuss several heuristic strategies which allow one to solve the Whitehead’s minim...
AbstractThe Whitehead Minimization problem is a problem of finding elements of the minimal length in...
AbstractLet Fn be the free group of a finite rank n. We study orbits Orbφ(u), where u is an element ...
Abstract. We describe a linear time probabilistic algorithm to recognize Whitehead minimal elements ...
We study the computational complexity of the Word Problem (WP) in free solvable groups Sr;d, where r...
AbstractLet u be a cyclic word in a free group Fn of finite rank n that has the minimum length over ...
We say the endomorphism problem is solvable for an element W in a free group F if it can be decided ...
We find polynomial-time solutions to the word problem for free-by-cyclic groups, the word problem fo...
AbstractThe complexity of some classical algorithmic problems in free groups is studied. Problems li...
We say the endomorphism problem is solvable for an element W in a free group F if it can be decided ...
AbstractLet u be a cyclic word in a free group Fn of finite rank n that has the minimum length over ...
We solve the Whitehead problem for automorphisms, monomor-phisms and endomorphisms in Zm ˆ Fn after ...
Abstract. We examine the relationship between the complexity of the word problem for a presentation ...
AbstractThe relative complexity of the following problems on abelian groups represented by an explic...
The Whitehead minimization problem consists in finding a minimum size element in the automorphic orb...
In this paper we discuss several heuristic strategies which allow one to solve the Whitehead’s minim...
AbstractThe Whitehead Minimization problem is a problem of finding elements of the minimal length in...
AbstractLet Fn be the free group of a finite rank n. We study orbits Orbφ(u), where u is an element ...
Abstract. We describe a linear time probabilistic algorithm to recognize Whitehead minimal elements ...
We study the computational complexity of the Word Problem (WP) in free solvable groups Sr;d, where r...
AbstractLet u be a cyclic word in a free group Fn of finite rank n that has the minimum length over ...
We say the endomorphism problem is solvable for an element W in a free group F if it can be decided ...
We find polynomial-time solutions to the word problem for free-by-cyclic groups, the word problem fo...
AbstractThe complexity of some classical algorithmic problems in free groups is studied. Problems li...
We say the endomorphism problem is solvable for an element W in a free group F if it can be decided ...
AbstractLet u be a cyclic word in a free group Fn of finite rank n that has the minimum length over ...
We solve the Whitehead problem for automorphisms, monomor-phisms and endomorphisms in Zm ˆ Fn after ...
Abstract. We examine the relationship between the complexity of the word problem for a presentation ...
AbstractThe relative complexity of the following problems on abelian groups represented by an explic...