On the Faithful Projective Representations of Finite Groups and their Minimal Dimension

Abstract

The first part of this article is devoted to characterizing the cocycles α of a finite group G that give rise to faithful projective representations of G. We prove that a p-group G admits a faithful irreducible projective representation if and only if the cohomology class [α] does not lie in the image of the inflation map inf: H2\!(G / N, C×) H2\!(G, C×) for any non-trivial central subgroup N of G. In the case where [α] ∈ Im(inf), we determine a criterion such that a direct sum of irreducible α-representations is faithful. We conclude this part by describing the behaviour of cocycles α that yield faithful irreducible representations for direct products of groups. In the second part, we introduce the notion of the projective embedding degree of a finite group G, defined as the smallest integer n such that G embeds into PGLn(C); equivalently, it is the smallest n such that G has a faithful complex projective representation of degree n. We also define the analogous notion of the irreducible projective embedding degree of G. These invariants have been investigated for several classes of groups, including direct products of groups, finite abelian groups, extra-special p-groups, Heisenberg groups, and groups of order p3, p4 (for primes p), and p5 (for p ≥ 5).