New constructions of 2-to-1 mappings over 2n and their applications to binary linear codes

Abstract

The 2-to-1 mapping over finite fields has a wide range of applications, including combinatorial mathematics and coding theory. Thus, constructions of 2-to-1 mappings have attracted considerable attention recently. Based on summarizing the existing construction results of all 2-to-1 mappings over finite fields with even characteristic, this article first applies the generalized switching method to the study of 2-to-1 mappings, that is, to construct 2-to-1 mappings over the finite field Fql with F(x)=G(x)+ Trql/q(R(x)), where G is a monomial and R is a monomial or binomial. Using the properties of Dickson polynomial theory and the complete characterization of low-degree equations, we construct a total of 16 new classes of 2-to-1 mappings, which are not QM-equivalent to any existing 2-to-1 polynomials. Among these, 9 classes are of the form cx + Trql/q(xd), and 7 classes have the form cx + Trql/q(xd1 + xd2). These new infinite classes explain most of numerical results by MAGMA under the conditions that q=2k, k>1, kl<14 and c ∈ ql*. Finally, we construct some binary linear codes using the newly proposed 2-to-1 mappings of the form cx + Trql/q(xd). The weight distributions of these codes are also determined. Interestingly, our codes are self-orthogonal, minimal, and have few weights.