On k-connectivity oracles in k-connected graphs
Abstract
A k-connectivity oracle for a graph G=(V,E) is a data structure that given s,t ∈ V determines whether there are at least k+1 internally disjoint st-paths in G. For undirected graphs, Pettie, Saranurak & Yin [STOC 2022, pp. 151-161] proved that any k-connectivity oracle requires (kn) bits of space. They asked whether (kn) bits are still necessary if G is k-connected. We will show by a very simple proof that this is so even if G is k-connected, answering this open question.
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