Further Study of Planar Functions in Characteristic Two

Abstract

Planar functions are of great importance in the constructions of DES-like iterated ciphers, error-correcting codes, signal sets and the area of mathematics. They are defined over finite fields of odd characteristic originally and generalized by Y. Zhou Zhou in even characteristic. In 2016, L. Qu Q proposed a new approach to constructing quadratic planar functions over 2n. Very recently, D. Bartoli and M. Timpanella Bartoli characterized the condition on coefficients a,b such that the function fa,b(x)=ax22m+1+bx2m+1 ∈23m[x] is a planar function over 23m by the Hasse-Weil bound. In this paper, using the Lang-Weil bound, a generalization of the Hasse-Weil bound, and the new approach introduced in Q, we completely characterize the necessary and sufficient conditions on coefficients of four classes of planar functions over qk, where q=2m with m sufficiently large (see Theorem main). The first and last classes of them are over q2 and q4 respectively, while the other two classes are over q3. One class over q3 is an extension of fa,b(x) investigated in Bartoli, while our proofs seem to be much simpler. In addition, although the planar binomial over q2 of our results is finally a known planar monomial, we also answer the necessity at the same time and solve partially an open problem for the binomial case proposed in Q.