Let $A$ and $B$ be $n\times n$ matrices with complex entries such that $AB - BA$ is a linear combination of $A$ and $B$.
I'd like to prove that there exists a non-zero vector $v$ that is an eigenvector of both $A$ and $B$.
2026-04-28 01:09:11.1777338551
Noncommuting complex matrices: Existence of a simultaneous eigenvector
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