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Shortest LCD embeddings of binary, ternary and quaternary linear codes

2 Pith papers cite this work. Polarity classification is still indexing.

2 Pith papers citing it
abstract

In the recent years, there has been active research on self-orthogonal embeddings of linear codes since they yielded some optimal self-orthogonal codes. LCD codes have a trivial hull so they are counterparts of self-orthogonal codes. So it is a natural question whether one can embed linear codes into optimal LCD codes. To answer it, we first determine the number of columns to be added to a generator matrix of a linear code in order to embed the given code into an LCD code. Then we characterize all possible forms of shortest LCD embeddings of a linear code. As examples, we start from binary and ternary Hamming codes of small lengths and obtain optimal LCD codes with minimum distance 4. Furthermore, we find new ternary LCD codes with parameters including $[23, 4, 14]$, $[23, 5, 12]$, $[24, 6, 12]$, and $[25, 5, 14]$ and a new quaternary LCD $[21, 10, 8]$ code, each of which has minimum distance one greater than those of known codes. This shows that our shortest LCD embedding method is useful in finding optimal LCD codes over various fields.

fields

cs.IT 2

years

2026 2

verdicts

UNVERDICTED 2

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representative citing papers

Shortest Embeddings of Linear Codes with Arbitrary Hull Dimension

cs.IT · 2026-04-10 · unverdicted · novelty 7.0

Exact lengths of shortest t-dimensional hull embeddings for linear codes are derived via quadratic form theory and group theory, with algorithms that classify codes by Gram matrix types and yield new optimal codes.

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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Showing 2 of 2 citing papers after filters.

  • Shortest Embeddings of Linear Codes with Arbitrary Hull Dimension cs.IT · 2026-04-10 · unverdicted · none · ref 2 · internal anchor

    Exact lengths of shortest t-dimensional hull embeddings for linear codes are derived via quadratic form theory and group theory, with algorithms that classify codes by Gram matrix types and yield new optimal codes.

  • Embedding linear codes over Z4 into self-orthogonal codes cs.IT · 2026-06-08 · unverdicted · none · ref 2 · 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.