Copyright © Philip M. Parker, INSEAD. Terms of Use.
(From Wikipedia, the free Encyclopedia)
Any Lie group is a representation of itself (via ) and the tangent space is mapped to itself by the group action. This gives the linear adjoint representation.
The adjoint representation of a Lie algebra L sends x in L to ad(x), where ad(x)(y) = [x y]. If L arises as the Lie algebra of a Lie group G, the usual method of passing from Lie group representations to Lie algebra representations sends the adjoint representation of G to the adjoint representation of L.
The adjoint representation can also be defined for algebraic groups over any field.
The co-adjoint representation is the contragredient representation of the adjoint representation. A. Kirillov observed that the orbit of any vector in a co-adjoint representation is a symplectic manifold. According to the philosophy in representation theory known as the orbit method, the irreducible representations of a Lie group G should be indexed in some way by its co-adjoint orbits.Examples
Variants and analogues
Source: the above text is adapted by the editor from Wikipedia, the free encyclopedia under a copyleft GNU Free Documentation License (GFDL) from the article "Adjoint representation."
Copyright © Philip M. Parker, INSEAD. Terms of Use.