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The paper systematically classifies rings based on the dominant metric dimensions (Ddim) of their associated CZDG, establishing consequential bounds for the Ddim of these compressed zero-divisor graphs. The authors investigate the interplay between the ring-theoretic properties of a ring (R) and associated CZDG. An undirected graph consisting of vertex set (Z (RE) \0\ =\ RE\0, 1), where (RE=\x: \ x R\) and (x=\y R: \ ann (x) =ann (y) \) is called a compressed zero-divisor graph, denoted by (E (R) ). An edge is formed between two vertices (x) and (y) of (Z (RE) ) if and only if (xy=xy=0), that is, iff (xy=0). For a ring (R), graph (G) is said to be realizable as (E (R) ) if (G) is isomorphic to (E (R) ). Moreover, an exploration into the Ddim of realizable graphs for rings is conducted, complemented by illustrative examples reinforcing the presented results. A recent discussion within the paper elucidates the nuanced relationship between Ddim, diameter, and girth within the domain of compressed zero-divisor graphs. This research offers a comprehensive and insightful analysis at the intersection of algebraic structures and graph theory, providing valuable contributions to the current mathematical discourse.
Ali et al. (Wed,) studied this question.
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