Singularities of Symmetric Hypersurfaces and Reed-Solomon Codes

ANTONIO CAFURE; GUILLERMO MATERA; MELINA PRIVITELLI

ADVANCES IN MATHEMATICS OF COMMUNICATIONS

AMER INST MATHEMATICAL SCIENCES

Año: 2012 vol. 6 p. 69 - 94

1930-5346

We determine conditions on q for the nonexistence of deep holes of the standard Reed-Solomon code of dimension k over Fq generated by polynomials of degree k + d. Our conditions rely on the existence of q-rational points with nonzero, pairwise-distinct coordinates of a certain family of hypersurfaces defined over Fq . We show that the hypersurfaces under consideration are invariant under the action of the symmetric group of permutations of the coordinates. This allows us to obtain critical information concerning the singular locus of these hypersurfaces, from which the existence of q-rational points is established.