On Projective representations of direct product of groups
Abstract
Let G=G1 × G2 be a finite group. We know that the second cohomology group H2(G, C×) is isomorphic to H2(G1, C×) × H2(G2, C×) × Hom(G1/G1' Z G2/G2', C× ). A 2-cocycle α of G is called a bilinear cocycle if the corresponding cohomology class [α] of H2(G, C×) lies in Hom(G1/G1' Z G2/G2', C×). In this article, our aim is to construct an irreducible complex projective representation of G for bilinear cocycles α. If G1 is any abelian p-group and G2 is an elementary abelian p-group, then we give a construction of for bilinear cocycles α of G. For a subgroup H of G of index ≤ p2, we also count the number of cohomology classes [α] for which the irreducible projective representations behave the same while restricting on H. Finally, we consider any p-group G=G1× G2, and we discuss how the above construction helps us to describe an irreducible α-representation of G when [α] is of order p or G2/G2' is elementary abelian. We also discuss several examples as an application of the above results.
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