Abstract
Given a graph \(G=(V,E)\) of order \(n\) and an \(n\)-dimensional non-negative vector \(\mathbf{d}=(d(1),d(2),\ldots ,d(n))\), called demand vector, the vector domination (resp., total vector domination) is the problem of finding a minimum \(S\subseteq V\) such that every vertex \(v\) in \(V\setminus S\) (resp., in \(V\)) has at least \(d(v)\) neighbors in \(S\). The (total) vector domination is a generalization of many dominating set type problems, e.g., the dominating set problem, the \(k\)-tuple dominating set problem (this \(k\) is different from the solution size), and so on, and subexponential fixed-parameter algorithms with respect to solution size for apex-minor-free graphs (so for planar graphs) are known. In this paper, we consider maximization versions of the problems; that is, for a given integer \(k\), the goal is to find an \(S\subseteq V\) with size \(k\) that maximizes the total sum of satisfied demands. For these problems, we design subexponential fixed-parameter algorithms with respect to \(k\) for apex-minor-free graphs.
This work is partially supported by KAKENHI No. 23500022, 24700001, 24106004, 25104521 and 25106508, the Kayamori Foundation of Informational Science Advancement and The Asahi Glass Foundation.
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Ishii, T., Ono, H., Uno, Y. (2014). Subexponential Fixed-Parameter Algorithms for Partial Vector Domination. In: Fouilhoux, P., Gouveia, L., Mahjoub, A., Paschos, V. (eds) Combinatorial Optimization. ISCO 2014. Lecture Notes in Computer Science(), vol 8596. Springer, Cham. https://doi.org/10.1007/978-3-319-09174-7_25
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