S. H. Jafari, S. R. Musawi
Published 2024-03-12Version 1
For a simple graph $G$, the $2$-distance graph, $D_2(G)$, is a graph with the vertex set $V(G)$ and two vertices are adjacent if and only if their distance is $2$ in the graph $G$. In this paper, for graphs $G$ with diameter 2, we show that $diam(D_2(G))$ can be any integer $t\geqslant2$. For graphs $G$ with $diam(G)\geqslant3$, we prove that $\frac{1}{2}diam(G)\leqslant diam(D_2(G))$ and this inequality is sharp. Also, for $diam(G)=3$, we prove that $diam(D_2(G))\leqslant5$ and this inequality is sharp.
Comments: 10 pages, 15 figures. arXiv admin note: text overlap with arXiv:2306.15301, arXiv:2403.06132
Characterizing $2$-Distance Graphs and Solving the Equations $T_2(X)=kP_2$ or $K_m \cup K_n$
Diameter Constraints in $2$-distance Graphs
On multivariate Newton-like inequalities
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