Generalization the parameters of minimal linear codes over the ring Zpl and Zp1p2
Abstract
In this article, We introduce a condition that is both necessary and sufficient for a linear code to achieve minimality when analyzed over the rings Zn.The fundamental inquiry in minimal linear codes is the existence of a [m,k] minimal linear code where k is less than or equal to m. W. Lu et al. ( see nine) showed that there exists a positive integer m(k;q) such that for m≥ m(k;q) a minimal linear code of length m and dimension k over a finite field Fq must exist. They give the upper and lower bound of m(k;q). In this manuscript, we establish both an upper and lower bound for m(k;pl) and m(k;p1p2) within the ring Zpl and Zp1p2 respectively.
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