Abstract algebra stubs

Isomorphism extension theorem In field theory, a branch of mathematics, the isomorphism…

In mathematics, the Alperin–Brauer–Gorenstein theorem characterizes the finite simple groups with quasidihedral or wreathed[1] Sylow 2-subgroups. These are isomorphic either to three-dimensional projective special linear groups or projective special unitary groups over a finite field of odd order, depending on a certain congruence, or to the Mathieu group
{displaystyle M_{11}}
. Alperin, Brauer & Gorenstein (1970) proved this in the course of 261 pages. The subdivision by 2-fusion is sketched there, given as an exercise in Gorenstein (1968, Ch. 7), and presented in some detail in Kwon et al. (1980).

Grauert–Riemenschneider vanishing theorem In mathematics, the Grauert–Riemenschneider vanishing theorem is an extension…

Mumford vanishing theorem In algebraic geometry, the Mumford vanishing theorem proved by…

Fitting's theorem This article does not cite any sources. Please help improve…

Artin–Zorn theorem In mathematics, the Artin–Zorn theorem, named after Emil Artin and…

Brauer–Suzuki theorem In mathematics, the Brauer–Suzuki theorem, proved by Brauer & Suzuki…