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Shortest Embeddings of Linear Codes with Arbitrary Hull Dimension

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abstract

In this paper, we study the shortest $t$-dimensional hull embeddings of linear codes in both Euclidean and Hermitian cases, extending the existing research on the shortest LCD and self-orthogonal embeddings to arbitrary hull dimensions and arbitrary finite fields. We obtain the exact length of such embeddings by adopting tools from quadratic form theory over finite fields and classical group theory. Based on the congruence equivalence class of Gram matrices of linear codes, we classify linear codes into distinct ``types'' and present corresponding constructive algorithms. In particular, we improve the results of An et al. and fully determine the length of the shortest self-orthogonal embeddings for linear codes. Finally, applying these algorithms, we provide examples for various settings and obtain several optimal codes inequivalent to those in the BKLC database.

fields

cs.IT 1

years

2026 1

verdicts

UNVERDICTED 1

representative citing papers

Embedding linear codes over Z4 into self-orthogonal codes

cs.IT · 2026-06-08 · unverdicted · novelty 6.0

Determines minimal lengths for self-orthogonal embeddings of Z4-linear codes and binary codes, classifies doubly even cases, and constructs twelve improved Z4 codes via an algorithm.

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  • Embedding linear codes over Z4 into self-orthogonal codes cs.IT · 2026-06-08 · unverdicted · none · ref 34 · internal anchor

    Determines minimal lengths for self-orthogonal embeddings of Z4-linear codes and binary codes, classifies doubly even cases, and constructs twelve improved Z4 codes via an algorithm.