An Application of the Hasse-Weil Bound to Rational Functions over Finite Fields

Abstract

We use the Aubry-Perret bound for singular curves, a generalization of the Hasse-Weil bound, to prove the following curious result about rational functions over finite fields: Let f(X),g(X)∈ Fq(X)\0\ be such that q is sufficiently large relative to deg\, f and deg\, g, f( Fq)⊂ g( Fq\∞\), and for ``most'' a∈ Fq\∞\, |\x∈ Fq:g(x)=g(a)\|>(deg\, g)/2. Then there exists h(X)∈ Fq(X) such that f(X)=g(h(X)). A generalization to multivariate rational functions is also included.