On two problems of Carlitz and their generalizations

Abstract

Let Nq be the number of solutions to the equation (a1x1m1+…+anxnmn)k=bx1k1·s xnkn over the finite field Fq= Fps. Carlitz found formulas for~Nq when k1=…=kn=m1=…=mn=1, k=2, n=3 or 4, p>2; and when m1=…=mn=2, k=k1=…=kn=1, n=3 or 4, p>2. In earlier papers, we studied the above equation with k1=…=kn=1 and obtained some generalizations of Carlitz's results. Recently, Pan, Zhao and Cao considered the case of arbitrary positive integers k1,…,kn and proved the formula Nq=qn-1+(-1)n-1, provided that (Σj=1n (kjm1·s mn/mj)-km1·s mn,q-1)=1. In this chapter, we determine Nq explicitly in some other cases.