In this paper we investigate computational properties of the Diophantine problem for spherical equations in some classes of finite groups. We classify the complexity of different variations of the problem, e.g., when $G$ is fixed and when $G$ is a part of the input. When the group $G$ is constant or given as multiplication table, we show that the problem always can be solved in polynomial time. On the other hand, for the permutation groups $S_n$ (with $n$ part of the input), the problem is NP-complete. The situation for matrix groups is quite involved: while we exhibit sequences of 2-by-2 matrices where the problem is NP-complete, in the full group $GL(2,p)$ ($p$ prime and part of the input) it can be solved in polynomial time. We also fi...
AbstractWe study the computational complexity of the isomorphism and equivalence problems on systems...
We prove that in a torsion-free hyperbolic group Γ, the length of the value of each variable in a mi...
AbstractWe study the average complexity of certain numerical algorithms when adapted to solving syst...
AbstractWe study the computational complexity of solving systems of equations over a finite group. A...
Over twenty years ago, Goldmann and Russell initiated the study of the complexity of the equation sa...
Over twenty years ago, Goldmann and Russell initiated the study of the complexity of the equation sa...
In this thesis we consider two different types of algorithmic problems over groups. In the first par...
We study the algorithmic complexity of determining whether a system of polynomial equations over a f...
Goldmann and Russell (2002) initiated the study of the complexity of the equation satisfiability pro...
The complexity of the equation solvability problem is known for nilpotent groups, for not solvable g...
We study the computational complexity of the Word Problem (WP) in free solvable groups Sr;d, where r...
We provide polynomial time algorithms for deciding equation solvability and identity checking over ...
A dolgozatban véges csoportokra és véges gyűrűkre vizsgáljuk az egyenletmegoldhatóság és az ekvivale...
For a fixed finite algebra ?, we consider the decision problem SysTerm(?): does a given system of te...
AbstractTits has shown that a finitely generated matrix group either contains a nonabelian free grou...
AbstractWe study the computational complexity of the isomorphism and equivalence problems on systems...
We prove that in a torsion-free hyperbolic group Γ, the length of the value of each variable in a mi...
AbstractWe study the average complexity of certain numerical algorithms when adapted to solving syst...
AbstractWe study the computational complexity of solving systems of equations over a finite group. A...
Over twenty years ago, Goldmann and Russell initiated the study of the complexity of the equation sa...
Over twenty years ago, Goldmann and Russell initiated the study of the complexity of the equation sa...
In this thesis we consider two different types of algorithmic problems over groups. In the first par...
We study the algorithmic complexity of determining whether a system of polynomial equations over a f...
Goldmann and Russell (2002) initiated the study of the complexity of the equation satisfiability pro...
The complexity of the equation solvability problem is known for nilpotent groups, for not solvable g...
We study the computational complexity of the Word Problem (WP) in free solvable groups Sr;d, where r...
We provide polynomial time algorithms for deciding equation solvability and identity checking over ...
A dolgozatban véges csoportokra és véges gyűrűkre vizsgáljuk az egyenletmegoldhatóság és az ekvivale...
For a fixed finite algebra ?, we consider the decision problem SysTerm(?): does a given system of te...
AbstractTits has shown that a finitely generated matrix group either contains a nonabelian free grou...
AbstractWe study the computational complexity of the isomorphism and equivalence problems on systems...
We prove that in a torsion-free hyperbolic group Γ, the length of the value of each variable in a mi...
AbstractWe study the average complexity of certain numerical algorithms when adapted to solving syst...