The affine preservers of non-singular matrices

Abstract

When K is an arbitrary field, we study the affine automorphisms of Mn(K) that stabilize GLn(K). Using a theorem of Dieudonn\'e on maximal affine subspaces of singular matrices, this is easily reduced to the known case of linear preservers when n>2 or #K>2. We include a short new proof of the more general Flanders' theorem for affine subspaces of Mp,q(K) with bounded rank. We also find that the group of affine transformations of M2(F2) that stabilize GL2(F2) does not consist solely of linear maps. Using the theory of quadratic forms over F2, we construct explicit isomorphisms between it, the symplectic group Sp4(F2) and the symmetric group S6.