A Polynomial Sieve and Sums of Deligne Type

Abstract

Let f∈Z[T] be any polynomial of degree d>1 and F∈Z[X0,...,Xn] an irreducible homogeneous polynomial of degree e>1 such that the projective hypersurface V(F) is smooth. In this paper we give a bound for \[ N(f,F,B):=|\x∈Zn+1:0≤ i≤ n|xi|≤ B,∃ t∈Z such that f(t)=F(x)\|, \] To do this, we introduce a generalization of the Heath-Brown and Munshi's power sieve and we extend two results by Deligne and Katz on estimates for additive and multiplicative characters in many variables.