Expansion properties of polynomials over finite fields
Abstract
We establish expansion properties for suitably generic polynomials of degree d in d+1 variables over finite fields. In particular, we show that if P∈Fq[x1,…,xd+1] is a polynomial of degree d coming from an explicit, Zariski dense set, and X1,…,Xd+1⊂eqFq are suitably large, then |P(X1,…,Xd+1)|=q-O(1). Our methods rely on a higher-degree extension of a result of Vinh on point--line incidences over a finite field.
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