Unital locally matrix algebras and Steinitz numbers
Abstract
An F-algebra A with unit 1 is said to be a locally matrix algebra if an arbitrary finite collection of elements a1, …, as from A lies in a subalgebra B with 1 of the algebra A, that is isomorphic to a matrix algebra Mn(F), n≥ 1. To an arbitrary unital locally matrix algebra A we assign a Steinitz number n(A) and study a relationship between n(A) and A.
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