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Embedding in MDS codes and Latin cubes

Published 2021-09-30Version 1

An embedding of a code is a mapping that preserves distances between codewords. We prove that any code with code distance $\rho$ and length $d$ can be embedded into an MDS code with the same code distance and length but under a larger alphabet. As a corollary we obtain embeddings of systems of partial mutually orthogonal Latin cubes and $n$-ary quasigroups.

Comments: 7 pages

Journal: Journal of Combinatorial Designs. 2022. V. 30 (9). P. 626--633

DOI: 10.1002/jcd.21849

Categories: math.CO

Subjects: 05B15

Keywords: mds code, code distance, partial mutually orthogonal latin cubes, larger alphabet, preserves distances

Tags: journal article

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Embedding in MDS codes and Latin cubes

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arXiv:2109.14962 [math.CO]Abstract References Reviews Resources