We consider the problem of finding edge search strategies of minimum cost. The cost of a search strategy is the sum of searchers used in the clearing steps of the search. One of the natural questions is whether it is possible to find a search strategy that minimizes both the cost and the number of searchers used to clear a given graph G. We call such a strategy ideal. We prove, by an example, that ideal search strategies do not exist in general. On the other hand, we provide a formula for the cost of clearing complete graphs. From our construction it follows that an ideal search strategy of a complete graph does exist and can be calculated efficiently. For general graphs G we give a polynomial-time O(log n)-approximation algorithm for finding minimum cost search strategies. We also prove that recontamination does not help to obtain minimum cost edge search strategies.
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Informacje dodatkowe
- DOI
- Cyfrowy identyfikator dokumentu elektronicznego link otwiera się w nowej karcie 10.1016/j.tcs.2013.06.009
- Kategoria
- Publikacja w czasopiśmie
- Typ
- artykuł w czasopiśmie wyróżnionym w JCR
- Język
- angielski
- Rok wydania
- 2013
Źródło danych: MOSTWiedzy.pl - publikacja "On minimum cost edge searching" link otwiera się w nowej karcie
