English

Common Invariant Subspace and Commuting Matrices

Rings and Algebras 2012-11-01 v4

Abstract

Let KK be a perfect field, LL be an extension field of KK and A,BMn(K)A,B\in\mathcal{M}_n(K). If AA has nn distinct eigenvalues in LL that are explicitly known, then we can check if A,BA,B are simultaneously triangularizable over LL. Now we assume that A,BA,B have a common invariant proper vector subspace of dimension kk over an extension field of KK and that χA\chi_A, the characteristic polynomial of AA, is irreducible over KK. Let GG be the Galois group of χA\chi_A. We show the following results i) If k1,n1k\in{1,n-1}, then A,BA,B commute. ii) If 1kn11\leq k\leq n-1 and G=SnG=\mathcal{S}_n or G=AnG=\mathcal{A}_n, then AB=BAAB=BA. iii) If 1kn11\leq k\leq n-1 and nn is a prime number, then AB=BAAB=BA. Yet, when n=4,k=2n=4,k=2, we show that A,BA,B do not necessarily commute if GG is not S4\mathcal{S}_4 or A4\mathcal{A}_4. Finally we apply the previous results to solving a matrix equation.

Keywords

Cite

@article{arxiv.1206.3630,
  title  = {Common Invariant Subspace and Commuting Matrices},
  author = {Gerald Bourgeois},
  journal= {arXiv preprint arXiv:1206.3630},
  year   = {2012}
}

Comments

8 pages. Many improvements. Submitted

R2 v1 2026-06-21T21:20:25.853Z