We present an algorithm for the following problem: given a context-free grammar for the word problem of a virtually free group G, compute a finite graph of groups G with finite vertex groups and fundamental group G. Our algorithm is non-deterministic and runs in doubly exponential time. It follows that the isomorphism problem of context-free groups can be solved in doubly exponential space. Moreover, if, instead of a grammar, a finite extension of a free group is given as input, the construction of the graph of groups is in NP and, consequently, the isomorphism problem in PSPACE
In this paper we combine many of the standard and more recent algebraic techniques for testing isomo...
AbstractWe show that Graph Isomorphism is in the complexity class SPP, and hence it is in ⊕P (in fac...
AbstractA polynomial time isomorphism test for a class of groups, properly containing the class of a...
Testing isomorphism of infinite groups is a classical topic, but from the complexity theory viewpoin...
Abstract. A compressed variant of the word problem for finitely generated groups, where the input wo...
AbstractWe give a characterization of the automorphism group of context-free graphs (this kind of gr...
The isomorphism problem of finite groups, that is, the task of deciding whether two given finite gro...
We investigate the complexity of algorithmic problems on finitely generated subgroups of free groups...
AbstractThe complexity of some classical algorithmic problems in free groups is studied. Problems li...
AbstractWe prove that the isomorphism problem for finitely generated fully residually free groups (o...
Graph isomorphisms are adjacency and label (equivalence class) preserving one-to-one correspondences...
AbstractWe investigate the complexity of algorithmic problems on finitely generated subgroups of fre...
The isomorphism problem for groups given by their multiplication tables has long been known to be so...
Abstract. The aim of this paper is to present a PSPACE algorithm which yields a finite graph of expo...
We give a simple algorithm to solve the subgroup membership problem for virtually free groups. For a...
In this paper we combine many of the standard and more recent algebraic techniques for testing isomo...
AbstractWe show that Graph Isomorphism is in the complexity class SPP, and hence it is in ⊕P (in fac...
AbstractA polynomial time isomorphism test for a class of groups, properly containing the class of a...
Testing isomorphism of infinite groups is a classical topic, but from the complexity theory viewpoin...
Abstract. A compressed variant of the word problem for finitely generated groups, where the input wo...
AbstractWe give a characterization of the automorphism group of context-free graphs (this kind of gr...
The isomorphism problem of finite groups, that is, the task of deciding whether two given finite gro...
We investigate the complexity of algorithmic problems on finitely generated subgroups of free groups...
AbstractThe complexity of some classical algorithmic problems in free groups is studied. Problems li...
AbstractWe prove that the isomorphism problem for finitely generated fully residually free groups (o...
Graph isomorphisms are adjacency and label (equivalence class) preserving one-to-one correspondences...
AbstractWe investigate the complexity of algorithmic problems on finitely generated subgroups of fre...
The isomorphism problem for groups given by their multiplication tables has long been known to be so...
Abstract. The aim of this paper is to present a PSPACE algorithm which yields a finite graph of expo...
We give a simple algorithm to solve the subgroup membership problem for virtually free groups. For a...
In this paper we combine many of the standard and more recent algebraic techniques for testing isomo...
AbstractWe show that Graph Isomorphism is in the complexity class SPP, and hence it is in ⊕P (in fac...
AbstractA polynomial time isomorphism test for a class of groups, properly containing the class of a...