t-Fold s-Blocking Sets and s-Minimal Codes

Abstract

Blocking sets and minimal codes have been studied for many years in projective geometry and coding theory. In this paper, we provide a new lower bound on the size of t-fold s-blocking sets without the condition t ≤ q, which is stronger than the classical result of Beutelspacher in 1983. Then a lower bound on lengths of projective s-minimal codes is also obtained. It is proved that (s+1)-minimal codes are certainly s-minimal codes. We generalize the Ashikhmin-Barg condition for minimal codes to s-minimal codes. Many infinite families of s-minimal codes satisfying and violating this generalized Ashikhmin-Barg condition are constructed. We also give several examples which are binary minimal codes, but not 2-minimal codes.

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