Extremal Values of the Atom-Bond Connectivity Index for Trees with Given Roman Domination Numbers

Abstract

Consider that G=(X, Y) is a simple, connected graph with X as the vertex set and Y as the edge set. The atom-bond connectivity (ABC) index is a novel topological index that Estrada introduced in Estrada et al. (1998). It is defined as A B C(G)=Σxy ∈ Y(G) ζx+ζy-2ζx ζy where ζx and ζx represent the degrees of the vertices x and y, respectively. In this work, we explore the behavior of the A B C index for tree graphs. We establish both lower and upper bounds for the A B C index, expressed in terms of the graph's order and its Roman domination number. Additionally, we characterize the tree structures that correspond to these extremal values, offering a deeper understanding of how the Roman domination number (RDN) influences the A B C index in tree graphs.

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