Trace Monomial Boolean Functions with Large High-Order Nonlinearities

Abstract

Exhibiting an explicit Boolean function with a large high-order nonlinearity is an important problem in cryptography, coding theory, and computational complexity. We prove lower bounds on the second-order, third-order, and higher-order nonlinearities of some trace monomial Boolean functions. We prove lower bounds on the second-order nonlinearities of functions trn(x7) and trn(x2r+3) where n=2r. Among all trace monomials, our bounds match the best second-order nonlinearity lower bounds by Car08 and YT20 for odd and even n respectively. We prove a lower bound on the third-order nonlinearity for functions trn(x15), which is the best third-order nonlinearity lower bound. For any r, we prove that the r-th order nonlinearity of trn(x2r+1-1) is at least 2n-1-2(1-2-r)n+r2r-1-1- O(2n2). For r 2 n, this is the best lower bound among all explicit functions.