AbstractWe study the computational complexity of the isomorphism and equivalence problems on systems of equations over a fixed finite group. We show that the equivalence problem is in P if the group is Abelian, and coNP-complete if the group is non-Abelian. We prove that if the group is non-Abelian, then the problem of deciding whether two systems of equations over the group are isomorphic is coNP-hard. If the group is Abelian, then the isomorphism problem is GRAPH ISOMORPHISM-hard. Moreover, if we impose the restriction that all equations are of bounded length, then we prove that the isomorphism problem for systems of equations over finite Abelian groups is GRAPH ISOMORPHISM-complete. Finally, we prove that the problem of counting the numb...
The isomorphism problem of finite groups, that is, the task of deciding whether two given finite gro...
The group isomorphism problem asks whether two given groups are isomorphic or not. Whereas the case ...
We consider the problem of testing isomorphism of groups of order n given by Cayley tables. The triv...
AbstractWe study the computational complexity of the isomorphism and equivalence problems on systems...
AbstractWe study the computational complexity of solving systems of equations over a finite group. A...
A polynomial-time isomorphism test for a class of groups, properly containing the class of Abelian g...
AbstractAn open question is the computational complexity of recognizing when two graphs are isomorph...
AbstractWe consider the problem of determining if two finite groups are isomorphic. The groups are a...
We consider the problem of determining if two finite groups are isomorphic. The groups are assumed t...
We provide polynomial time algorithms for deciding equation solvability and identity checking over ...
AbstractAn equation over a finite group G is an expression of form w1w2…wk=1G, where each wi is a va...
Abstract We consider the complexity of the isomorphism relation on countable first-order structures ...
The isomorphism problem for groups given by their multiplication tables has long been known to be so...
An algebra $\cal A$ is finitely presented if there is a finite set G of generator symbols, a finite...
In the thesis we investigate the connections between arbitrary functions and their realizing polynom...
The isomorphism problem of finite groups, that is, the task of deciding whether two given finite gro...
The group isomorphism problem asks whether two given groups are isomorphic or not. Whereas the case ...
We consider the problem of testing isomorphism of groups of order n given by Cayley tables. The triv...
AbstractWe study the computational complexity of the isomorphism and equivalence problems on systems...
AbstractWe study the computational complexity of solving systems of equations over a finite group. A...
A polynomial-time isomorphism test for a class of groups, properly containing the class of Abelian g...
AbstractAn open question is the computational complexity of recognizing when two graphs are isomorph...
AbstractWe consider the problem of determining if two finite groups are isomorphic. The groups are a...
We consider the problem of determining if two finite groups are isomorphic. The groups are assumed t...
We provide polynomial time algorithms for deciding equation solvability and identity checking over ...
AbstractAn equation over a finite group G is an expression of form w1w2…wk=1G, where each wi is a va...
Abstract We consider the complexity of the isomorphism relation on countable first-order structures ...
The isomorphism problem for groups given by their multiplication tables has long been known to be so...
An algebra $\cal A$ is finitely presented if there is a finite set G of generator symbols, a finite...
In the thesis we investigate the connections between arbitrary functions and their realizing polynom...
The isomorphism problem of finite groups, that is, the task of deciding whether two given finite gro...
The group isomorphism problem asks whether two given groups are isomorphic or not. Whereas the case ...
We consider the problem of testing isomorphism of groups of order n given by Cayley tables. The triv...