Trevor Olsen scite author profile

Let $G$ be a a connected graph. The Wiener index of a connected graph is the sum of the distances between all unordered pairs of vertices. We provide asymptotic formulae for the maximum Wiener index of simple triangulations and quadrangulations with given connectivity, as the order increases, and make conjectures for the extremal triangulations and quadrangulations based on computational evidence. If $\overline{\sigma}(v)$ denotes the arithmetic mean of the distances from $v$ to all other vertices of $G$, then the remoteness of $G$ is defined as the largest value of $\overline{\sigma}(v)$ over all vertices $v$ of $G$. We give sharp upper bounds on the remoteness of simple triangulations and quadrangulations of given order and connectivity.

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Proximity in Triangulations and Quadrangulations

Czabarka¹,

Dankelmann²,

Olsen³

et al. 2020

Preprint

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Let G be a connected graph. If σ(v) denotes the arithmetic mean of the distances from v to all other vertices of G, then the proximity, π(G), of G is defined as the smallest value of σ(v) over all vertices v of G. We give upper bounds for the proximity of simple triangulations and quadrangulations of given order and connectivity. We also construct simple triangulations and quadrangulations of given order and connectivity that match the upper bounds asymptotically and are likely optimal.

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Trevor Olsen

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Wiener Index and Remoteness in Triangulations and Quadrangulations

Proximity in Triangulations and Quadrangulations

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