Differential uniformity and second order derivatives for generic polynomials

Abstract

For any polynomial f of F\2n[x] we introduce the following characteristic of the distribution of its second order derivative,which extends the differential uniformity notion:δ2(f):=\α ∈ F\2n ,α' ∈ F\2n ,β ∈ F\2n α=α' \x∈ F\2n D\α,α'2f(x)=β\where D\α,α'2f(x):=D\α'(D\αf(x))=f(x)+f(x+α)+f(x+α')+f(x+α+α') is the second order derivative.Our purpose is to prove a density theorem relative to this quantity,which is an analogue of a density theorem proved by Voloch for the differential uniformity.