New maximum scattered linear sets of the projective line

Abstract

In [2] and [19] are presented the first two families of maximum scattered Fq-linear sets of the projective line PG(1,qn). More recently in [23] and in [5], new examples of maximum scattered Fq-subspaces of V(2,qn) have been constructed, but the equivalence problem of the corresponding linear sets is left open. Here we show that the Fq-linear sets presented in [23] and in [5], for n=6,8, are new. Also, for q odd, q 1,\,0 5, we present new examples of maximum scattered Fq-linear sets in PG(1,q6), arising from trinomial polynomials, which define new Fq-linear MRD-codes of Fq6× 6 with dimension 12, minimum distance 5 and middle nucleus (or left idealiser) isomorphic to Fq6.