Directed Multicut with linearly ordered terminals
Reviewed by Pithpith:GXBBK22Jopen to challenge →
classification
cs.DS
cs.CR
keywords
directedsizealgorithmapplicationcasecutsetdistinguishededge
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Motivated by an application in network security, we investigate the following "linear" case of Directed Mutlicut. Let $G$ be a directed graph which includes some distinguished vertices $t_1, \ldots, t_k$. What is the size of the smallest edge cut which eliminates all paths from $t_i$ to $t_j$ for all $i < j$? We show that this problem is fixed-parameter tractable when parametrized in the cutset size $p$ via an algorithm running in $O(4^p p n^4)$ time.
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