Abstract
We extend a well-known theorem of Burnside in the setting of general fields as follows: for a general field F the matrix algebra $$M_n(F)$$ is the only algebra in $$M_n(F)$$ which is spanned by an irreducible semigroup of triangularizable matrices. In other words, for a semigroup of triangularizable matrices with entries from a general field irreducibility is equivalent to absolute irreducibility. As a consequence of our result we prove a stronger version of a theorem of Janez Bernik.
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