Max-Cut via Kuramoto-type Oscillators

Abstract

We consider the Max-Cut problem. Let G = (V,E) be a graph with adjacency matrix (aij)i,j=1n. Burer, Monteiro & Zhang proposed to find, for n angles \θ1, θ2, …, θn\ ⊂ [0, 2π], minima of the energy f(θ1, …, θn) = Σi,j=1n aij (θi - θj) because configurations achieving a global minimum leads to a partition of size 0.878 Max-Cut(G). This approach is known to be computationally viable and leads to very good results in practice. We prove that by replacing (θi - θj) with an explicit function g(θi - θj) global minima of this new functional lead to a (1-)Max-Cut(G). This suggests some interesting algorithms that perform well. It also shows that the problem of finding approximate global minima of energy functionals of this type is NP-hard in general.