Schur multiplicator
Schur multiplier, of a group 
The cohomology group 
, where 
is the multiplicative group of complex numbers with trivial 
-action. The Schur multiplicator was introduced by I. Schur [1] in his work on finite-dimensional complex projective representations of a group (cf. Projective representation). If 
is such a representation, then 
can be interpreted as a mapping 
such that
 |
where 
is a 
-cocycle with values in 
. In particular, the projective representation 
is the projectivization of a linear representation 
if and only if the cocycle 
determines the trivial element of the group 
. If 
, then 
is called a closed group in the sense of Schur. If 
is a finite group, then there exist natural isomorphisms
 |
Let 
. If a central extension
 | (*) |
of a finite group 
is given, then there is a natural mapping 
whose image coincides with 
. This mapping 
coincides with the mapping 
induced by the cup-product with the element of 
defined by the extension (*). Conversely, for any subgroup 
there is an extension (*) such that 
. If 
, then the extension (*) is uniquely determined by the homomorphism 
. If 
is a monomorphism, then any projective representation of 
is induced by some linear representation of 
.
References
| [1] | I. Schur, "Ueber die Darstellung der endlichen Gruppen durch gebrochene lineare Substitutionen" J. Reine Angew. Math. , 127 (1904) pp. 20–50 |
| [2] | S. MacLane, "Homology" , Springer (1975) |
Comments
References
| [a1] | G. Gruenberg, "Cohomological topics in group theory" , Lect. notes in math. , 143 , Springer (1970) |
| [a2] | C.W. Curtis, I. Reiner, "Methods of representation theory" , I , Wiley (Interscience) (1981) |
Schur multiplicator. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Schur_multiplicator&oldid=48625