Minimal groups of given representation dimension
Abstract
For a finite group G, let rdim(G) denote the smallest dimension of a faithful, complex linear representation of G. It is clear that rdim(H)≤ rdim(G) for any subgroup H of G. We consider G with the property that rdim(H)<rdim(G) whenever H is a proper subgroup of G, in particular proving a classification of such groups when G is abelian or rdim(G)≤ 3.
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