Samenvatting
The k-independence number of a graph, which extends the
classical independence number, is the maximum size of a set of vertices
at pairwise distance greater than k. The associated decision problem is
known to be NP-complete for general graphs, and it is also known to
remain NP-complete for regular bipartite graphs when k ∈ {2,3,4} and for
planar bipartite graphs of maximum degree 3 for all k ≥ 2. We continue
this line of research by showing that the problem remains NP-complete
when considering several other graph classes. Moreover, we establish a
new connection between the k-independence number and the h-diameter,
which is a natural generalization of the graph diameter. Finally, we use this
new link to show the (parametrized) complexity of the decision problem
associated to computing the h-diameter.
classical independence number, is the maximum size of a set of vertices
at pairwise distance greater than k. The associated decision problem is
known to be NP-complete for general graphs, and it is also known to
remain NP-complete for regular bipartite graphs when k ∈ {2,3,4} and for
planar bipartite graphs of maximum degree 3 for all k ≥ 2. We continue
this line of research by showing that the problem remains NP-complete
when considering several other graph classes. Moreover, we establish a
new connection between the k-independence number and the h-diameter,
which is a natural generalization of the graph diameter. Finally, we use this
new link to show the (parametrized) complexity of the decision problem
associated to computing the h-diameter.
| Originele taal-2 | English |
|---|---|
| Pagina's (van-tot) | 30-38 |
| Aantal pagina's | 8 |
| Tijdschrift | Matematica Contemporanea |
| Volume | 55 |
| Status | Published - 2023 |
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