Critical edges/ vertices in directed graph
Given a weighted directed graph $$$G$$$ and $$$2$$$ different vertices $$$s$$$ and $$$t$$$ in it. How can we find all edges $$$e$$$ such that removing $$$e$$$ increases the distance between $$$s$$$ and $$$t$$$? Is there a better way then $$$O(E*E*log(V))$$$ time method where we test each edge by removing it? Can we also find all vertices $$$v$$$ defined analogously?
| Rev. | Язык | Кто | Когда | Δ | Комментарий | |
|---|---|---|---|---|---|---|
| en3 |
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frying_pan | 2023-07-21 15:46:56 | 21 | Tiny change: 'then $O(E*(E + V))$ where' -> 'then $O(E*E*log(V))$ where' | |
| en2 |
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frying_pan | 2023-07-21 15:45:32 | 9 | Tiny change: 'Given a directed ' -> 'Given a weighted directed ' | |
| en1 |
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frying_pan | 2023-07-21 15:44:20 | 349 | Initial revision (published) |
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