Weight distribution of cyclic codes defined by quadratic forms and related curves

Abstract

We consider cyclic codes CL associated to quadratic trace forms in m variables QR(x) = Trqm/q(xR(x)) determined by a family L of q-linearized polynomials R over Fqm, and three related codes CL,0, CL,1 and CL,2. We describe the spectra for all these codes when L is an even rank family, in terms of the distribution of ranks of the forms QR in the family L, and we also compute the complete weight enumerator for CL. In particular, considering the family L = xq , with fixed in N, we give the weight distribution of four parametrized families of cyclic codes C, C,0, C,1 and C,2 over Fq with zeros \ α-(q+1) \, \ 1,\, α-(q+1) \, \ α-1,\,α-(q+1) \ and \ 1,\,α-1,\,α-(q+1)\ respectively, where q = ps with p prime, α is a generator of Fqm* and m/(m,) is even. Finally, we give simple necessary and sufficient conditions for Artin-Schreier curves yp-y = xR(x) + β x, p prime, associated to polynomials R ∈ L to be optimal. We then obtain several maximal and minimal such curves in the case L = xp and L = xp, xp3 .