Theoretical and Computational Approaches to Determining Sets of Orders for (k,g)-Graphs

Abstract

The Cage Problem requires for a given pair k ≥ 3, g ≥ 3 of integers the determination of the order of a smallest k-regular graph of girth g. We address a more general version of this problem and look for the (k,g)-spectrum of orders of (k,g)-graphs: the (infinite) list of all orders of (k,g)-graphs. By establishing these spectra we aim to gain a better understanding of the structure and properties of (k,g)-graphs and hope to use the acquired knowledge in both determining new orders of smallest k-regular graphs of girth g as well as developing a set of tools suitable for constructions of extremal graphs with additional requirements. We combine theoretical results with computer-based searches, and determine or determine up to a finite list of unresolved cases the (k,g)-spectra for parameter pairs for which the orders of the corresponding cages have already been established.

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