Add to ORKGGeneralizing a classical theorem of Jordan to arbitrary characteristic, we prove that every finite subgroup of GLn over a field of any characteristic p possesses a subgroup of bounded index which is composed of finite simple groups of Lie type in characteristic p, a commutative group of order prime to p, and a p-group. While this statement can be deduced from the classification of finite simple groups, our proof is self-contained and uses methods only from algebraic geometry and the theory of linear algebraic groups. We believe that our results can serve as a viable substitute for classification in a range of applications in various areas of mathematics
Abstract. If K is an infinite field and G ⊆ K is a subgroup of finite index in an additive group, th...
We prove an old standing conjecture by showing that the lattice of subgroups of every finite simple ...
Let be an algebraically closed field and let G be a finite-dimensional algebraic group over which is...
Generalizing a classical theorem of Jordan to arbitrary characteristic, we prove that every finite ...
Generalizing a classical theorem of Jordan to arbitrary characteristic, we prove that every finite ...
Generalizing a classical theorem of Jordan to arbitrary characteristic, we prove that every finite ...
Let G = G(K) be a simple algebraic group over an algebraically closed field K of characteristic p ...
AbstractIn this paper, we obtain a quantitative characterization of all finite simple groups. Let πt...
AbstractLetGbe a finite group andpa prime divisor of |G|. Ap-Steinberg character ofGis an irreducibl...
We characterise groups in which every abelian subgroup has finite index in its characteristic closur...
We characterise groups in which every abelian subgroup has finite index in its characteristic closur...
We characterise groups in which every abelian subgroup has finite index in its characteristic closur...
AbstractSuppose p is a prime, P is a finite p-group, and A is an abelian subgroup of P. Does P posse...
Abstract. If K is an infinite field and G ⊆ K is a subgroup of finite index in an additive group, th...
Abstract. If K is an infinite field and G ⊆ K is a subgroup of finite index in an additive group, th...
Abstract. If K is an infinite field and G ⊆ K is a subgroup of finite index in an additive group, th...
We prove an old standing conjecture by showing that the lattice of subgroups of every finite simple ...
Let be an algebraically closed field and let G be a finite-dimensional algebraic group over which is...
Generalizing a classical theorem of Jordan to arbitrary characteristic, we prove that every finite ...
Generalizing a classical theorem of Jordan to arbitrary characteristic, we prove that every finite ...
Generalizing a classical theorem of Jordan to arbitrary characteristic, we prove that every finite ...
Let G = G(K) be a simple algebraic group over an algebraically closed field K of characteristic p ...
AbstractIn this paper, we obtain a quantitative characterization of all finite simple groups. Let πt...
AbstractLetGbe a finite group andpa prime divisor of |G|. Ap-Steinberg character ofGis an irreducibl...
We characterise groups in which every abelian subgroup has finite index in its characteristic closur...
We characterise groups in which every abelian subgroup has finite index in its characteristic closur...
We characterise groups in which every abelian subgroup has finite index in its characteristic closur...
AbstractSuppose p is a prime, P is a finite p-group, and A is an abelian subgroup of P. Does P posse...
Abstract. If K is an infinite field and G ⊆ K is a subgroup of finite index in an additive group, th...
Abstract. If K is an infinite field and G ⊆ K is a subgroup of finite index in an additive group, th...
Abstract. If K is an infinite field and G ⊆ K is a subgroup of finite index in an additive group, th...
We prove an old standing conjecture by showing that the lattice of subgroups of every finite simple ...
Let be an algebraically closed field and let G be a finite-dimensional algebraic group over which is...