Abstract
An independent set S in a graph G is k-swap optimal if there is no independent set \(S'\) such that \(|S'|>|S|\) and \(|(S'\setminus S)\cup (S\setminus S')|\le k\). Motivated by applications in data reduction, we study whether we can determine efficiently if a given vertex v is contained in some k-swap optimal independent set or in all k-swap optimal independent sets. We show that these problems are NP-hard for constant values of k even on graphs with constant maximum degree. Moreover, we show that the problems are \(\mathrm {\Sigma ^{\text {P}}_{2}} \)-hard when k is not constant, even on graphs of constant maximum degree. We obtain similar hardness results for determining whether an edge is contained in a k-swap optimal max cut. Finally, we consider a certain type of edge-swap neighborhood for the Longest Path problem. We show that for a given edge we can decide in \(f(\varDelta +k)\cdot n^{\mathcal {O}(1)}\) time whether it is in some k-optimal path.
N. Morawietz—Supported by the Deutsche Forschungsgemeinschaft (DFG), project OPERAH, KO 3669/5-1.
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Notes
- 1.
For even k, an independent set is k-swap optimal if and only if it is \((k-1)\)-swap optimal [10]. Thus, only odd values of k are interesting.
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Komusiewicz, C., Morawietz, N. (2021). Can Local Optimality Be Used for Efficient Data Reduction?. In: Calamoneri, T., Corò, F. (eds) Algorithms and Complexity. CIAC 2021. Lecture Notes in Computer Science(), vol 12701. Springer, Cham. https://doi.org/10.1007/978-3-030-75242-2_25
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