Two Absolutely Irreducible Polynomials over F2 and Their Applications to a Conjecture by Carlet

Abstract

Two polynomials Fk(X1,…,Xk) and k(X1,…,Xk) over F2 arose from the study of a conjecture by C. Carlet about the sum-freedom of the multiplicative inverse function of F2n. Both Fk and k are homogeneous and symmetric with deg\,Fk=2k-2 and deg\,k=2k-1. It is known that Fk is absolutely irreducible for k 3. Using the Lang-Weil bound and a curious connection between Fk and k, we show that k (k 3) is also absolutely irreducible. This conclusion allows us to improve several existing results about Carlet's conjecture.

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