On the Brunnian conjecture
Abstract
Let p be a primer number, n ≥ 3 and integer. Let f(X) = Xn + an-1Xn-1 + ·s +a1 X + a0 ∈ Fp[X] be a primitive polynomial of degree n. Let Cf be the companion matrix of f(X), and G the companion matrix of the polynomial Xn-1. Define G1 := Cf and Gk+1 = G Gk G-1 for 0 ≤ k ≤ n-1. The so called ``Brunnian Conjecture'' states that: the general linear group GL(n,p) is generated by G1, G2, …, Gn. In this paper, we prove it for p ≥ 5 and n not divisible by p-1.
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