Weil algebra of a Lie algebra
Let 
be a connected Lie group with Lie algebra 
. The Weil algebra 
of 
was first introduced in a series of seminars by H. Cartan [a1], in part based on some unpublished work of A. Weil. As a differential graded algebra, it is given by the tensor product
 |
where 
and 
denote the exterior and symmetric algebras, respectively (cf. also Exterior algebra; Symmetric algebra).
The Weil algebra and its generalizations have been studied extensively by F.W. Kamber and Ph. Tondeur [a3] [a4]. Let 
be a maximal compact subgroup, with 
denoting the Lie algebra of 
. The relative Weil algebra for 
is defined by
 |
With regards to the universal classifying bundle 
(cf. also Bundle; Classifying space; Universal space), there are canonical isomorphisms in cohomology
 |
where 
denotes the 
-invariant polynomials. For a given integer 
, one has the ideal
 |
generated by 
, for 
. This leads to the truncated Weil algebra
 |
The cohomology 
plays a prominent role in the study of secondary characteristic classes (cf. also Characteristic class) of foliations and foliated bundles [a3] (see also [a2]).
References
| [a1] | H. Cartan, "Cohomologie réelle d'un espace fibré principal differentiable" , Sem. H. Cartan 1949/50, Exp. 19–20 (1950) |
| [a2] | J.L. Dupont, F.W. Kamber, "On a generalization of Cheeger–Chern–Simons classes" Illinois J. Math. , 34 (1990) MR1046564 Zbl 0724.57018 |
| [a3] | F.W. Kamber, Ph. Tondeur, "Foliated bundles and characteristic classes" , Lecture Notes in Mathematics , 493 , Springer (1975) MR0402773 MR0385886 Zbl 0311.57011 Zbl 0308.57011 |
| [a4] | F.W. Kamber, Ph. Tondeur, "Semi-simplicial Weil algebras and characteristic classes" Tôhoku Math. J. , 30 (1978) pp. 373–422 MR0509023 Zbl 0398.57006 |
Weil algebra of a Lie algebra. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Weil_algebra_of_a_Lie_algebra&oldid=14594