Higher weight spectra of ternary codes associated to the quadratic Veronese 3-fold
Abstract
The problem studied in this work is to determine the higher weight spectra of the Projective Reed-Muller codes associated to the Veronese 3-fold V in PG(9,q), which is the image of the quadratic Veronese embedding of PG(3,q) in PG(9,q). We reduce the problem to the following combinatorial problem in finite geometry: For each subset S of V, determine the dimension of the linear subspace of PG(9,q) generated by S. We develop a systematic method to solve the latter problem. We implement the method for q=3, and use it to obtain the higher weight spectra of the associated code. The case of a general finite field Fq will be treated in a future work.
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