Fixed-Parameter Complexity of Minimum Profile Problems
Abstract
Let G=(V,E) be a graph. An ordering of G is a bijection α: V \1,2,..., |V|\. For a vertex v in G, its closed neighborhood is N[v]=\u∈ V: uv∈ E\ \v\. The profile of an ordering α of G is α(G)=Σv∈ V(α(v)-\α(u): u∈ N[v]\). The profile (G) of G is the minimum of α(G) over all orderings α of G. It is well-known that (G) is the minimum number of edges in an interval graph H that contains G is a subgraph. Since |V|-1 is a tight lower bound for the profile of connected graphs G=(V,E), the parametrization above the guaranteed value |V|-1 is of particular interest. We show that deciding whether the profile of a connected graph G=(V,E) is at most |V|-1+k is fixed-parameter tractable with respect to the parameter k. We achieve this result by reduction to a problem kernel of linear size.
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