Let V be a vector space over the finite field Fq with q elements and Λ be the image of the Segre geometry PG(V)⊗PG(V⁎) in PG(V⊗V⁎) under the Segre map. Consider the subvariety Λ1 of Λ represented by the pure tensors x⊗ξ with x∈V and ξ∈V⁎ such that ξ(x)=0. Regarding Λ1 as a projective system of PG(V⊗V⁎), we study the linear code C(Λ1) arising from it. We show that C(Λ1) is a minimal code and we determine its basic parameters, its full weight list and its linear automorphism group. We also give a geometrical characterization of its minimum and second lowest weight codewords as well as of some of the words of maximum weight.
Cardinali, I., Giuzzi, L. (2026). Linear codes arising from the point-hyperplane geometry-Part I: The Segre embedding. FINITE FIELDS AND THEIR APPLICATIONS, 111 [10.1016/j.ffa.2025.102766].
Linear codes arising from the point-hyperplane geometry-Part I: The Segre embedding
Cardinali, Ilaria
;
2026-01-01
Abstract
Let V be a vector space over the finite field Fq with q elements and Λ be the image of the Segre geometry PG(V)⊗PG(V⁎) in PG(V⊗V⁎) under the Segre map. Consider the subvariety Λ1 of Λ represented by the pure tensors x⊗ξ with x∈V and ξ∈V⁎ such that ξ(x)=0. Regarding Λ1 as a projective system of PG(V⊗V⁎), we study the linear code C(Λ1) arising from it. We show that C(Λ1) is a minimal code and we determine its basic parameters, its full weight list and its linear automorphism group. We also give a geometrical characterization of its minimum and second lowest weight codewords as well as of some of the words of maximum weight.
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https://hdl.handle.net/11365/1308177