The number of composition factors of order p in completely reducible groups of characteristic p
Abstract
Let q be a power of a prime p and let G be a completely reducible subgroup of GL(d,q). We prove that the number of composition factors of G that have prime order p is at most (q d-1)/(p-1), where q is a function of q satisfying 1≤slantq≤slant 3/2. For every q, we give examples showing this bound is sharp infinitely often.
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