Traces of Hecke Operators and Refined Weight Enumerators of Reed-Solomon Codes

Abstract

We study the quadratic residue weight enumerators of the dual projective Reed-Solomon codes of dimensions 5 and q-4 over the finite field Fq. Our main results are formulas for the coefficients of the the quadratic residue weight enumerators for such codes. If q=pv and we fix v and vary p then our formulas for the coefficients of the dimension q-4 code involve only polynomials in p and the trace of the qth and (q/p2)th Hecke operators acting on spaces of cusp forms for the congruence groups SL2 (Z), 0(2), and 0(4). The main tool we use is the Eichler-Selberg trace formula, which gives along the way a variation of a theorem of Birch on the distribution of rational point counts for elliptic curves with prescribed 2-torsion over a fixed finite field.