Ternary Binomial and Trinomial Bent Functions in the Completed Maiorana-McFarland Class

Abstract

Two classes of ternary bent functions of degree four with two and three terms in the univariate representation that belong to the completed Maiorana-McFarland class are found. Binomials are mappings 34k given by f(x)=4k(a1 x2(3k+1)+a2 x(3k+1)2), where a1 is a nonsquare in 34k and a2 is defined explicitly by a1. Particular subclasses of the binomial bent functions we found can be represented by exceptional polynomials over . Bent trinomials are mappings 32k given by f(x)=n(a1 x2·3k+4 + a2 x3k+5 + a3 x2) with coefficients explicitly defined by the parity of k. The proof is based on a new criterion that allows checking bentness by analyzing first- and second-order derivatives of f in the direction of a chosen n/2-dimensional subspace.