Construction of Linear Codes from the Unit Graph G(Zn)
Abstract
In this paper, we consider the unit graph G(Zn), where n=p1n1 or p1n1p2n2 or p1n1p2n2p3n3 and p1, p2, p3 are distinct primes. For any prime q, we construct q-ary linear codes from the incidence matrix of the unit graph G(Zn) with their parameters. We also prove that the dual of the constructed codes have minimum distance either 3 or 4. Lastly, we stated two conjectures on diameter of unit graph G(Zn) and linear codes constructed from the incidence matrix of the unit graph G(Zn) for any integer n.
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