Projective (or spin) representations of finite groups. I
Abstract
Schur multiplier M(G) of a finite group G has been studied heavily. To proceed further to the study of projective (or spin) representations of G and their characters (called spin characters), it is necessary to construct explicitly a representation group R(G) of G, a certain central extension of G by M(G), since projective representations of G correspond bijectively to linear representations of R(G). We propose here a practical method to construct R(G) by repetition of one-step efficient central extensions according to a certain choice of a series of elements of M(G). This method is also helpful for constructing linear representations of R(G) and accordingly for calculating spin characters. Actually, we will apply this method to several examples of G with prime number 3 in M(G).
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