Extremal Cuts of Sparse Random Graphs
Abstract
For Erdos-R\'enyi random graphs with average degree γ, and uniformly random γ-regular graph on n vertices, we prove that with high probability the size of both the Max-Cut and maximum bisection are n(γ4 + P* γ4 + o(γ)) + o(n) while the size of the minimum bisection is n(γ4- P*γ4 + o(γ)) + o(n). Our derivation relates the free energy of the anti-ferromagnetic Ising model on such graphs to that of the Sherrington-Kirkpatrick model, with P* ≈ 0.7632 standing for the ground state energy of the latter, expressed analytically via Parisi's formula.
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