Samenvatting
A pseudoforest is a graph where each connected component contains at most one cycle, or alternatively, a graph that can be turned into a forest by removing at most one edge from each connected component. In this paper, we show that the following problem can be solved in O(3^k n k^O(1)) time: given a graph G and an integer k, can we delete at most k vertices from G such that we obtain a pseudoforest? The result improves upon an earlier result by Philip et al. (2015) who gave a (nonlinear) 7.56^k n^O(1)-time algorithm both in the exponential factor depending on k as well as in the polynomial factor depending on n.
Originele taal-2 | Engels |
---|---|
Pagina's (van-tot) | 42-56 |
Aantal pagina's | 15 |
Tijdschrift | Discrete Applied Mathematics |
Volume | 236 |
DOI's | |
Status | Gepubliceerd - 19 feb. 2018 |