ON THE HARDNESS OF APPROXIMATING MULTICUT AND SPARSEST-CUT 论文

摘要

We show that the Multicut, Sparsest-Cut, and Min-2CNF ≡ Deletion problems are NP-hard to approximate within every constant factor, assuming the Unique Games Conjecture of Khot (2002). A quantitatively stronger version of the conjecture implies an inapproximability factor of $$\Omega(\sqrt{\log \log n}).$$