Self-identifying codes in direct products of complete graphs with paths and cycles

Abstract

Identifying codes were introduced by Karpovsky et al. as dominating sets S⊂eq V(G) satisfying N[u] S ≠ N[v] S for any distinct vertices u,v. Later, Junnila et al. introduced the concept of self-identifying codes (previously called (1,≤1)+-identifying codes in earlier work), a dominating set S⊂eq V(G) such that c∈ N[u] S N[c] = \u\ for every vertex u. In this paper, we obtain bounds on the minimum size of a self-identifying code in the direct products Km× Pn and Km× Cn that are linear in n with coefficients depending on m, and these bounds are asymptotically tight. In particular, for Km× Pn with m,n3, our bounds closely approaches the size of an identifying code in the same graph, as determined by Shinde and Waphare.

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