The article investigates the minimum distance of evaluation codes associated to finite sets of points in projective space over an arbitrary field K. The key findings are:
d(X)a ≥ (k-1)(α(X) - 1 - a) + 1
This bound improves and generalizes previous results.
d(X)a ≤ k - 1
or
d(X)a ≥ (k-1)(s(X) - 1 - a) + 2
This result generalizes a previous bound obtained for complete intersection point sets in general linear position.
The proofs rely on understanding the geometry of the point sets, in particular the fact that n points in Pk-1 can be placed on ⌈n/(k-1)⌉ hyperplanes. The authors also discuss the relationship between the minimum distance, initial degree, and minimum socle degree, highlighting the importance of these homological invariants in the study of evaluation codes.
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by John Pawlina... pada arxiv.org 04-16-2024
https://arxiv.org/pdf/2310.00102.pdfPertanyaan yang Lebih Dalam