Betti Numbers and Higher Weight Spectra of Reed-Muller Codes RMq(2,2)

Abstract

We determine all the Betti numbers of the q-ary second order Reed-Muller codes of length q2, and also of the elongations of matroids associated to these codes. We then use it to determine the higher weight spectra of these codes. As a special case, we recover some results of Kaplan and Matei about counting certain curves over finite fields with prescribed rational intersection points. In geometric terms, our results relate to the affine Veronesean by which we mean the image of the affine plane A2 under the quadratic Veronese embedding of P2 in P5. Indeed, finding the higher weight spectra, of the Reed-Muller code considered here, corresponds to determining the number of Fq-rational points on all possible sections of this affine Veronesean by linear subvarieties of P5.