Maximum scattered linear sets and MRD-codes

Abstract

The rank of a scattered Fq-linear set of PG(r-1,qn), rn even, is at most rn/2 as it was proved by Blokhuis and Lavrauw. Existence results and explicit constructions were given for infinitely many values of r, n, q (rn even) for scattered Fq-linear sets of rank rn/2. In this paper we prove that the bound rn/2 is sharp also in the remaining open cases. Recently Sheekey proved that scattered Fq-linear sets of PG(1,qn) of maximum rank n yield Fq-linear MRD-codes with dimension 2n and minimum distance n-1. We generalize this result and show that scattered Fq-linear sets of PG(r-1,qn) of maximum rank rn/2 yield Fq-linear MRD-codes with dimension rn and minimum distance n-1.