Normal subgroups in the group of column-finite infinite matrices

Abstract

The classical result, due to Jordan, Burnside, Dickson, says that every normal subgroup of GL(n, K) (K - a field, n ≥ 3) which is not contained in the center, contains SL(n, K). A. Rosenberg gave description of normal subgroups of GL(V), where V is a vector space of any infinite cardinality dimension over a division ring. However, when he considers subgroups of the direct product of the center and the group of linear transformations g such that g-idV has finite dimensional range the proof is not complete. We fill this gap for countably dimensional V giving description of the lattice of normal subgroups in the group of infinite column-finite matrices indexed by positive integers over any field.