On approximate commutativity of spaces of matrices

Abstract

The maximal dimension of commutative subspaces of Mn(C) is known. So is the structure of such a subspace when the maximal dimension is achieved. We consider extensions of these results and ask the following natural questions: If V is a subspace of Mn(C) and k is an integer less than n, such that for every pair A and B of members of V, the rank of the commutator AB - BA is at most k, then how large can the dimension of V be? If this maximum is achieved, can we determine the structure of V? We answer the first question. We also propose a conjecture on the second question which implies, in particular, that such a subspace V has to be an algebra, just as in the known case of k = 0. We prove the proposed structure of V if it is already assumed to be an algebra.