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Some complexity results about threshold graphs
1994
Discrete Applied Mathematics
The problem of determining whether a graph G contains a threshold subgraph containing at least h edges is shown to be NP-complete if h is part of the input as the problems of minimum threshold completion, weighted 2-threshold partition and weighted 2-threshold covering. We also prove that the k-cyclic scheduling problem is NP-complete for all fixed k, a result used to show that deciding whether a threshold r-hypergraph contains a Hamiltonian cycle is NPcomplete.
doi:10.1016/0166-218x(94)90214-3
fatcat:62mrfm5cdfdepm2qtahxk4wp4y