In this paper, we present an algorithm that given a fixed prime power q and a positive integer N, finds an integer n ∈ [N, 2qN] and an element α ∈ Fqn of order greater than 2^n/logqⁿ, in time polynomial on N. Our result is inspired by the recent AKS primality testing algorithm [1] and the subsequent improvements [3, 4, 2].

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