Simply-connected group
A topological group (in particular, a Lie group) for which the underlying topological space is simply-connected. The significance of simply-connected groups in the theory of Lie groups is explained by the following theorems.
1) Every connected Lie group 
is isomorphic to the quotient group of a certain simply-connected group (called the universal covering of 
) by a discrete central subgroup isomorphic to 
.
2) Two simply-connected Lie groups are isomorphic if and only if their Lie algebras are isomorphic; furthermore, every homomorphism of the Lie algebra of a simply-connected group 
into the Lie algebra of an arbitrary Lie group 
is the derivation of a (uniquely defined) homomorphism of 
into 
.
The centre 
of a simply-connected semi-simple compact or complex Lie group 
is finite. It is given in the following table for the various kinds of simple Lie groups.'
<tbody> </tbody>
|
In the theory of algebraic groups (cf. Algebraic group), a simply-connected group is a connected algebraic group 
not admitting any non-trivial isogeny 
, where 
is also a connected algebraic group. For semi-simple algebraic groups over the field of complex numbers this definition is equivalent to that given above.
Comments
References
| [a1] | G. Hochschild, "The structure of Lie groups" , Holden-Day (1965) |
| [a2] | R. Hermann, "Lie groups for physicists" , Benjamin (1966) |
| [a3] | J.E. Humphreys, "Linear algebraic groups" , Springer (1975) pp. Sect. 35.1 |
Simply-connected group. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Simply-connected_group&oldid=18749