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On Central-Peripheral Appendage Numbers of Uniform Central Graphs

Published 22 May 2017 in math.CO | (1705.07982v1)

Abstract: In a uniform central graph (UCG) the eccentric verticies of a central vertex is the same for all central verticies. This collection of eccentric verticies is the centered periphery. For a pair of graphs $(C, P)$ the central-peripheral appendage number, $A_{ucg}(C, P)$, is the minimum number verticies needed to be adjoined to the graphs $C$ and $P$ in order to construct a uniform central graph H with center C and centered-periphery P. We compute $A_{ucg}(C, P)$ in terms of the radius and diameter of P and whether or not $C$ is a complete graph. In the process we show $A_{ucg}(C, P)\leq 6$ if $diam(P) > 2$. We also provide structure theorems for UCGs in terms of the centered periphery.

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