Counting solutions of special linear equations over finite fields

Abstract

Let q be a prime power, let Fq be the finite field with q elements and let d1, …, dk be positive integers. In this note we explore the number of solutions (z1, …, zk)∈ Fqk of the equation equation*L1(x1)+·s+Lk(xk)=b,equation* with the restrictions zi∈ Fqdi, where each Li(x) is a non zero polynomial of the form Σj=0miaijxqj∈ Fq[x] and b∈ Fq. We characterize the elements b for which the equation above has a solution and, in affirmative case, we determine the exact number of solutions. As an application of our main result, we obtain the cardinality of the sumset Σi=1k Fqdi:=\α1+·s+αk\,|\, αi∈ Fqdi\. Our approach also allows us to solve another interesting problem, regarding the existence and number of elements in Fqn with prescribed traces over intermediate Fq-extensions of Fqn.