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Paper detail

The Steiner Wiener index of trees with a given segment sequence

The Steiner distance of vertices in a set $S$ is the minimum size of a connected subgraph that contain these vertices. The sum of the Steiner distances over all sets $S$ of cardinality $k$ is called the Steiner $k$-Wiener index and studied as the natural generalization of the famous Wiener index in chemical graph theory. In this paper we study the extremal structures, among trees with a given segment sequence, that maximize or minimize the Steiner $k$-Wiener index. The same extremal problems are also considered for trees with a given number of segments.

preprint2020arXivOpen access
Jie ZhangHua WangXiao-Dong Zhang
math.CO
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Jie ZhangHua WangXiao-Dong Zhang

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