On a conjecture of Egecioglu and Irsic

Abstract

In 2021, \"O. Egecioglu, V. Irsic introduced the concept of Fibonacci-run graph Rn as an induced subgraph of Hypercube. They conjectured that the diameter of Rn is given by n-(1+n2)12-34. In this paper, we introduce the novel concept of distance-barriers between vertices in Rn and provide an elegant method to give lower bound for the diameter of Rn via distance-barriers. By constructing different types of distance-barriers, we show that the conjecture does not hold for all n≥ 230 and some of n between 91 and 229. Furthermore, lower bounds for the diameter of some Fibonacci-run graphs are obtained, which turn out to be better than the result given in the conjecture.