Extracting Densest Sub-hypergraph with Convex Edge-weight Functions
Abstract
The densest subgraph problem (DSG) aiming at finding an induced subgraph such that the average edge-weights of the subgraph is maximized, is a well-studied problem. However, when the input graph is a hypergraph, the existing notion of DSG fails to capture the fact that a hyperedge partially belonging to an induced sub-hypergraph is also a part of the sub-hypergraph. To resolve the issue, we suggest a function fe:Z0→ R 0 to represent the partial edge-weight of a hyperedge e in the input hypergraph H=(V,E,f) and formulate a generalized densest sub-hypergraph problem (GDSH) as S⊂eq VΣe∈ Efe(|e S|)|S|. We demonstrate that, when all the edge-weight functions are non-decreasing convex, GDSH can be solved in polynomial-time by the linear program-based algorithm, the network flow-based algorithm and the greedy 1r-approximation algorithm where r is the rank of the input hypergraph. Finally, we investigate the computational tractability of GDSH where some edge-weight functions are non-convex.
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