Weighted Treedepth is NP-complete on Graphs of Bounded Degree
Abstract
A treedepth decomposition of an undirected graph G is a rooted forest F on the vertex set of G such that every edge uv∈ E(G) is in ancestor-descendant relationship in F. Given a weight function w V(G)→ N, the weighted depth of a treedepth decomposition is the maximum weight of any path from the root to a leaf, where the weight of a path is the sum of the weights of its vertices. It is known that deciding weighted treedepth is NP-complete even on trees. We prove that weighted treedepth is also NP-complete on bounded degree graphs. On the positive side, we prove that the problem is efficiently solvable on paths and on 1-subdivided stars.
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