Generalized Hamming weights of toric codes over hypersimplices and square-free affine evaluation codes

Abstract

Let Fq be a finite field with q elements, where q is a power of prime p. A polynomial over Fq is square-free if all its monomials are square-free. In this note, we determine an upper bound on the number of zeroes in the affine torus T=(Fq*)s of any set of r linearly independent square-free polynomials over Fq in s variables, under certain conditions on r, s and degree of these polynomials. Applying the results, we partly obtain the generalized Hamming weights of toric codes over hypersimplices and square-free evaluation codes, as defined in hyper. Finally, we obtain the dual of these toric codes with respect to the Euclidean scalar product.