The proof of a conjecture about cages

Abstract

The girth of a graph is defined as the length of a shortest cycle in the graph. A (k; g)-cage is a graph of minimum order among all k-regular graphs with girth g. A cycle C in a graph G is termed nonseparating if the graph G-V(C) remains connected. A conjecture, proposed in [T. Jiang, D. Mubayi. Connectivity and Separating Sets of Cages. J. Graph Theory 29(1)(1998) 35--44], posits that every cycle of length g within a (k; g)-cage is nonseparating. While the conjecture has been proven for even g in the aforementioned work, this paper presents a proof demonstrating that the conjecture holds true for odd g as well. Thus, the previously mentioned conjecture was proven to be true.

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