nLab
elementary group
Redirected from "elementary groups".
Contents
Context
Representation theory
representation theory
geometric representation theory
Ingredients
representation, 2-representation, ∞-representation
-
group, ∞-group
-
group algebra, algebraic group, Lie algebra
-
vector space, n-vector space
-
affine space, symplectic vector space
-
action, ∞-action
-
module, equivariant object
-
bimodule, Morita equivalence
-
induced representation, Frobenius reciprocity
-
Hilbert space, Banach space, Fourier transform, functional analysis
-
orbit, coadjoint orbit, Killing form
-
unitary representation
-
geometric quantization, coherent state
-
socle, quiver
-
module algebra, comodule algebra, Hopf action, measuring
Geometric representation theory
-
D-module, perverse sheaf,
-
Grothendieck group, lambda-ring, symmetric function, formal group
-
principal bundle, torsor, vector bundle, Atiyah Lie algebroid
-
geometric function theory, groupoidification
-
Eilenberg-Moore category, algebra over an operad, actegory, crossed module
-
reconstruction theorems
Contents
Idea
In the context of finite groups, an elementary group is one isomorphic, for some prime number , to the direct product of
with
The concept of elementary subgroups, that is of subgroups that are elementary as groups, is used in some variants of the Brauer induction theorem.
References
See also:
Last revised on March 12, 2025 at 12:02:29.
See the history of this page for a list of all contributions to it.