A maximum hypergraph 3-cut problem with limited unbalance: approximation and analysis

We consider the max hypergraph 3-cut problem with limited unbalance (MH3C-LU). The objective is to divide the vertex set of an edge-weighted hypergraph $$H=(V,E,w)$$ H = ( V , E , w ) into three disjoint subsets $$V_{1}$$ V 1 , $$V_{2}$$ V 2 , and $$V_{3}$$ V 3 such that the sum of edge weights cross different parts is maximized subject to $$||V_{i}|-|V_{l}||\le B$$ | | V i | - | V l | | ≤ B ( $$\forall i\ne l\in \{1,2,3\}$$ ∀ i ≠ l ∈ { 1 , 2 , 3 } ) for a given parameter B. This problem is NP-hard because it includes some well-known problems like the max 3-section problem and the max 3-cut problem as special cases. We formulate the MH3C-LU as a ternary quadratic program and present a randomized approximation algorithm based on the complex semidefinite programming relaxation technique.