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图的k-单圈划分中的优化问题
The Optimization of k-Unicyclicly Partitioning a Graph
【摘要】 图的划分问题曾引起图论界的广泛关注.在文献[4]中讨论了k-单圈划分.本文进一步研究基于k-单圈划分的优化问题,即在一个赋权图中求一个最小权可k-单圈划分的支撑子图,以及对一个不存在k-单圈划分支撑子图的图,如何添最少的边使得它有k-单圈划分的支撑子图.
【Abstract】 The problem of partitioning a graph has been long concered. In [4], k-unicyclic partition problem is discussed. More generally, we discuss the optimization of k-unicyclic partition in this paper. That is how to get a spanning subgraph which has a k-unicycle partition with minimum weight in a weighted graph, and how to add minimum edges to get a spanning supgraph with k-unicyclic partition in a graph, if the graph doesn’t have a spanning subgraph with the partition.
【关键词】 κ-单圈划分;
优化;
最小权;
最少边;
【Key words】 k-unicycle partition; optimization; minimum weight; minimum edges.;
【Key words】 k-unicycle partition; optimization; minimum weight; minimum edges.;
【基金】 国家自然科学基金资助(批准号:69973001)
- 【文献出处】 运筹学学报 ,Or Transactions , 编辑部邮箱 ,2002年02期
- 【分类号】O157.5
- 【下载频次】47