The paper studies three domination-based identification problems in block graphs:
Identifying codes (ID-codes): The authors prove that the ID-number of a closed-twin-free block graph is bounded above by the number of blocks in the graph, verifying a conjecture from the literature.
Locating-dominating codes (LD-codes): The authors provide a general upper bound for the LD-number in terms of the number of blocks and the number of articulation vertices. They also prove that the LD-number of a twin-free block graph without isolated vertices is at most half the order of the graph, confirming a conjecture.
Open locating-dominating codes (OLD-codes): The authors establish tight lower and upper bounds for the OLD-number of block graphs, both in terms of the number of blocks and the order of the graph.
The authors provide examples of families of block graphs that attain these bounds, showing the tightness of the results. The paper complements previous work on the computational complexity of these problems and provides a comprehensive understanding of the structure of block graphs with respect to domination-based identification.
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