Triangles in graphs without the expansion of 4-cycle
Abstract
The expansion F of a graph F is the graph obtained from F by replacing each edge with a triangle. Lv ηl proposed a conjecture on the maximum number of triangles in a graph without Pk or Ck for every k 4. Their conjecture was confirmed in previous work for Pk when k 4 and Ck when k 5. In this note, we resolve the remaining case C4, demonstrating that this is the only counterexample to their conjecture.
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