Galois groups and rational solutions of p(X) = A
Abstract
We extend Theorem 1 of R. Reams, A Galois approach to m-th roots of matrices with rational entries, LAA 258 (1997), 187-194. Let p(λ) be any polynomial over Q and let A∈ Mn(Q) have irreducible characteristic polynomial f(λ) with degree n. We provide necessary and sufficient conditions for the existence of a solution X∈ Mn(Q) of the polynomial matrix equation p(X) = A. Specifically, we find necessary and sufficient conditions for f(p(λ)) to have a factor of degree n over Q.
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