Some Results on Linearized Trinomials that Split Completely

Abstract

Linearized polynomials over finite fields have been much studied over the last several decades. Recently there has been a renewed interest in linearized polynomials because of new connections to coding theory and finite geometry. We consider the problem of calculating the rank or nullity of a linearized polynomial L(x)=Σi=0dai xqi (where ai∈ Fqn) from the coefficients ai. The rank and nullity of L(x) are the rank and nullity of the associated Fq-linear map Fqn Fqn. McGuire and Sheekey defined a d× d matrix AL with the property that nullity (L)=nullity (AL -I). We present some consequences of this result for some trinomials that split completely, i.e., trinomials L(x)=xqd-bxq-ax that have nullity d. We give a full characterization of these trinomials for n d2-d+1.