Theorems of Burnside and Wedderburn revisited

Abstract

We approach celebrated theorems of Burnside and Wedderburn via simultaneous triangularization. First, for a general field F, we prove that Mn(F) is the only irrreducible subalgebra of triangularizable matrices in Mn(F) provided such a subalgebra exists. This provides a slight generalization of a well-known theorem of Burnside. Next, for a given n > 1, we characterize all fields F such that Burnside's Theorem holds in Mn(F), i.e., Mn(F) is the only irreducible subalgebra of itself. In fact, for a subfield F of the center of a division ring D, our simple proof of the aforementioned extension of Burnside's Theorem can be adjusted to establish a Burnside type theorem for irreducible F-algebras of triangularizable matrices in Mn(D) with inner eigenvalues in F, namely such subalgebras of Mn(D) are similar to Mn(F). We use Burnside's theorem to present a simple proof of a theorem due to Wedderburn. Then, we use our Burnside type theorem to prove an extension of Wedderburn's Theorem as follows: A subalgebra of a semi-simple left Artinian F-algebra is nilpotent iff the algebra, as a vector space over the field F, is spanned by its nilpotent members and that the minimal polynomials of all of its members split into linear factors over F. We conclude with an application of Wedderburn's Theorem.