$Construction of Linear Codes from the Unit Graph $G(\mathbb{Z}_{n}\oplus \mathbb{Z}_{m})$

Construction of Linear Codes from the Unit Graph $G(\mathbb{Z}_{n}\oplus \mathbb{Z}_{m})

In this paper, we develop the python code for generating unit graph $G(\mathbb{Z}_{n}\oplus\mathbb{Z}_{m})$, for any integers $m\ \& \ n$. For any prime $r$, we construct $r$-ary linear codes from the incidence matrix of the unit graph $G(\mathbb{Z}_{n}\oplus\mathbb{Z}_{m})$, where $n \ \& \...

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Hauptverfasser:	Shaikh, Wajid M, Jain, Rupali S, Reddy, B. Surendranath
Format:	Artikel
Sprache:	eng
Schlagworte:	Mathematics - Rings and Algebras
Online-Zugang:	Volltext bestellen
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Zusammenfassung:	In this paper, we develop the python code for generating unit graph $G(\mathbb{Z}_{n}\oplus\mathbb{Z}_{m})$, for any integers $m\ \& \ n$. For any prime $r$, we construct $r$-ary linear codes from the incidence matrix of the unit graph $G(\mathbb{Z}_{n}\oplus\mathbb{Z}_{m})$, where $n \ \& \ m$ are either power of prime or product of power of primes. We also prove the minimum distance of dual of the constructed codes as either 3 or 4. Finally, we state conjectures two on linear codes constructed from the unit graph $G(\mathbb{Z}_{n}\oplus \mathbb{Z}_{m})$, for any integer $m\ \& \ n$.
DOI:	10.48550/arxiv.2402.11257