Mathieu subspaces of codimension less than n of Matn(K)

Abstract

We classify all Mathieu subspaces of Matn(K) of codimension less than n, under the assumption that char\, K = 0 or char\, K n. More precisely, we show that any proper Mathieu subspace of Matn(K) of codimension less than n is a subspace of \M ∈ Matn(K) tr\, M = 0\ if char\, K = 0 or char\, K n. On the other hand, we show that every subspace of \M ∈ Matn(K) tr\, M = 0\ of codimension less than n in Matn(K) is a Mathieu subspace of Matn(K) if char\, K = 0 or char\, K n+1.