A Note on the Computational Complexity of Unsmoothened Vertex Attack Tolerance
Abstract
We have previously introduced vertex attack tolerance (VAT) and unsmoothened VAT (UVAT), denoted respectively as τ(G) = S ⊂ V |S||V-S-Cmax(V-S)|+1 and τ(G) = S ⊂ V |S||V-S-Cmax(V-S)|, where Cmax(V-S) is the largest connected component in V-S, as appropriate mathematical measures of resilience in the face of targeted node attacks for arbitrary degree networks. Here we prove the hardness of approximating τ under various plausible computational complexity hypotheses.
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