The following pages link to (Q4015753):
Displaying 23 items.
- Linear groups over general rings. I: Generalities. (Q354787) (← links)
- More variations on the decomposition of transvections. (Q547244) (← links)
- Automorphisms of Chevalley groups of type \(B_l\) over local rings with \(1/2\). (Q548759) (← links)
- Automorphisms of Chevalley groups of types \(A_l\), \(D_l\), \(E_l\) over local rings without \(1/2\). (Q548760) (← links)
- Isomorphisms of general linear groups over associative rings graded by a commutative group. (Q656277) (← links)
- Isomorphisms of a complete linear group over an associative ring (Q790258) (← links)
- Linear groups over maximal orders (Q799816) (← links)
- Decomposition of transvections for automorphisms. (Q844485) (← links)
- Isomorphisms of unitary groups over associative rings (Q1059156) (← links)
- Isomorphisms of general linear groups over rings (Q1065936) (← links)
- Isomorphisms of the linear groups \(\operatorname{GL}_{2}(R)\) over associative rings \(R\) (Q1702721) (← links)
- Elementary equivalence of stable linear groups over local commutative rings with \(1/2\) (Q1991553) (← links)
- Homomorphisms of Lie groups (Q1991556) (← links)
- Isomorphisms of stable linear groups over associative rings containing \(\frac{1}{2}\). (Q2018037) (← links)
- Residual and fixed modules (Q2199067) (← links)
- Isomorphisms of general linear groups over associative rings graded by an Abelian group. (Q2248317) (← links)
- Stable groups over associative rings with \(1/2\). A description of isomorphisms of the stable linear groups. (Q2258882) (← links)
- Elementary equivalence of linear groups over rings with a finite number of central idempotents and over Boolean rings. (Q2258886) (← links)
- Extending Hua's theorem on the geometry of matrices to Bézout domains (Q2427933) (← links)
- (Q3035502) (← links)
- (Q3824590) (← links)
- Elementary equivalence of stable linear groups over fields of characteristic 2 (Q6597853) (← links)
- Automorphisms of a Chevalley group of type \(G_2\) over a commutative ring \(R\) with \(1/3\) generated by the invertible elements and \(2R\) (Q6608054) (← links)
