On an edge ranking problem of trees and graphs
Discrete Applied Mathematics
Approximating treewidth, pathwidth, frontsize, and shortest elimination tree
Journal of Algorithms
Edge ranking of graphs is hard
Discrete Applied Mathematics
Optimal edge ranking of trees in linear time
Proceedings of the ninth annual ACM-SIAM symposium on Discrete algorithms
On minimum edge ranking spanning trees
Journal of Algorithms
Minimum Edge Ranking Spanning Trees of Threshold Graphs
ISAAC '02 Proceedings of the 13th International Symposium on Algorithms and Computation
Generalized Edge-Ranking of Trees (Extended Abstract)
WG '96 Proceedings of the 22nd International Workshop on Graph-Theoretic Concepts in Computer Science
Efficient Parallel Query Processing by Graph Ranking
Fundamenta Informaticae
Vertex rankings of chordal graphs and weighted trees
Information Processing Letters
Binary identification problems for weighted trees
WADS'11 Proceedings of the 12th international conference on Algorithms and data structures
On the complexity of searching in trees and partially ordered structures
Theoretical Computer Science
The binary identification problem for weighted trees
Theoretical Computer Science
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In this paper we consider the edge ranking problem of weighted trees. We prove that a special instance of this problem, namely edge ranking of multitrees is NP-hard already for multitrees with diameter at most 10. Note that the same problem but for trees is linearly solvable. We give an O(logn)-approximation polynomial time algorithm for edge ranking of weighted trees.