Isotropy representation
The natural linear representation of the isotropy group of a differentiable transformation group in the tangent space to the underlying manifold. If 
is a group of differentiable transformations on a manifold 
and 
is the corresponding isotropy subgroup at the point 
, then the isotropy representation 
associates with each 
the differential 
of the transformation 
at 
. The image of the isotropy representation, 
, is called the linear isotropy group at 
. If 
is a Lie group with a countable base acting smoothly and transitively on 
, then the tangent space 
can naturally be identified with the space 
, where 
are the Lie algebras of the groups 
. Furthermore, the isotropy representation 
is now identified with the representation 
induced by the restriction of the adjoint representation (cf. Adjoint representation of a Lie group) 
of 
to 
.
If a homogeneous space 
is reductive, that is, if 
, where 
is an invariant subspace with respect to 
, then 
can be identified with 
, while 
can be identified with the representation 
(see [3]). In this case, the isotropy representation is faithful (cf. Faithful representation) if 
acts effectively.
The isotropy representation and linear isotropy group play an important role in the study of invariant objects on homogeneous spaces (cf. Invariant object). The invariant tensor fields on a homogeneous space 
are in one-to-one correspondence with the tensors on 
that are invariant with respect to the isotropy representation. In particular, 
has an invariant Riemannian metric if and only if 
has a Euclidean metric that is invariant under the linear isotropy group. There exists on the homogeneous space 
a positive invariant measure if and only if 
for all 
. A homogeneous space has an invariant orientation if and only if 
for all 
. The invariant linear connections on 
are in one-to-one correspondence with the linear mappings 
with the following properties:
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A generalization of the concept of the isotropy representation is the concept of the isotropy representation of order 
. This is a homomorphism 
of the group 
into the group 
of invertible 
-jets of diffeomorphisms of the space 
taking the zero to itself. This concept is used in the study of invariant objects of higher orders.
References
| [1] | R. Sulanke, P. Wintgen, "Differentialgeometrie und Faserbündel" , Deutsch. Verlag Wissenschaft. (1972) |
| [2] | S. Helgason, "Differential geometry, Lie groups, and symmetric spaces" , Acad. Press (1978) |
| [3] | P.K. Rashevskii, "On the geometry of homogeneous spaces" , Proc. Sem. Vektor. Tenzor. Anal. i Prilozh. k Geom., Mekh. i Fiz. , 9 , Moscow-Leningrad (1952) pp. 49–74 (In Russian) |
| [4] | E. Cartan, "La théorie des groupes finis et continus et l'analyse situs" , Gauthier-Villars (1930) |
| [5] | S. Kobayashi, K. Nomizu, "Foundations of differential geometry" , 2 , Interscience (1969) |
Comments
References
| [a1] | S. Helgason, "Groups and geometric analysis" , Acad. Press (1984) pp. Chapt. II, Sect. 4 |
Isotropy representation. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Isotropy_representation&oldid=15929