On the product of elements with prescribed trace

Abstract

This paper deals with the following problem. Given a finite extension of fields L/K and denoting the trace map from L to K by Tr, for which elements z in L, and a, b in K, is it possible to write z as a product x· y, where x,y∈ L with Tr(x)=a, Tr(y)=b? We solve most of these problems for finite fields, with a complete solution when the degree of the extension is at least 5. We also have results for arbitrary fields and extensions of degrees 2,3 or 4. We then apply our results to the study of PN functions, semifields, irreducible polynomials with prescribed coefficients, and to a problem from finite geometry concerning the existence of certain disjoint linear sets.