The structure of maximal nilpotent linear subspaces of Formula: see text, and more generally of Formula: see text for any field Formula: see text with at least three elements, is now well established. In this work we extend the analysis to dimension five. The main result of this paper consists of the description, up to similarity, of all two-dimensional nilpotent linear subspaces of Formula: see text. We expect that these results will allow us to describe every maximal nilpotent linear subspace of Formula: see text. We think that this classification is central to the solution of the classical problem of Albert about finite-dimensional power-associative nilalgebras with dimension Formula: see text. In addition, we provide new and interesting examples of irreducible and maximal subspaces of Formula: see text nilpotent matrices.
Fernández et al. (Fri,) studied this question.
Synapse has enriched 5 closely related papers on similar clinical questions. Consider them for comparative context: