Reconstructing Bounded Treelength Graphs with Linearithmic Shortest Path Distance Queries
Abstract
We consider the following graph reconstruction problem: given an unweighted connected graph G = (V,E) with visible vertex set V and an oracle which takes two vertices u,v ∈ V and returns the shortest path distance between u and v, how many queries are needed to reconstruct E? Specifically, we consider bounded degree and bounded treelength tl connected graphs and show that reconstruction can be done in O,tl(n n) queries with a deterministic algorithm. This result improves over the best known algorithm (deterministic or randomized) for this graph class by a n factor and matches the known lower bound for the class of graphs with bounded chordality, which is a subclass of bounded treelength graphs.
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