A Characterization of Triangle-Free Cyclic Graphs With Self-Loops Of Rank 3
Abstract
Let GS be a self-loop graph as the graph obtained by attaching a self-loop at every vertex in S ⊂eq V(G) of a simple graph G. If G=Cn is the cycle graphs of order n and S ≠ , we show that there are no rank 3 self-loop graphs (Cn)S for n≥ 5. As a consequence, we determine and construct all possible rank 3 triangle-free self-loop cyclic graph of order at least 4 from (C4)S via graph join operations. This provides a partial solution to the characterization problem of rank 3 self-loop graphs.
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