Evaluation codes arising from symmetric polynomials
Abstract
Datta and Johnsen (Des. Codes and Cryptogr., 91 (2023), 747-761) introduced a new family of evalutation codes in an affine space of dimension 2 over a finite field Fq where linear combinations of elementary symmetric polynomials are evaluated on the set of all points with pairwise distinct coordinates. In this paper, we propose a generalization by taking low dimensional linear systems of symmetric polynomials. Computation for small values of q=7,9 shows that carefully chosen generalized Datta-Johnsen codes [12q(q-1),3,d] have minimum distance d equal to the optimal value minus 1.
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