Sparse Hypergraphs and Pebble Game Algorithms

Abstract

A hypergraph G=(V,E) is (k,)-sparse if no subset V'⊂ V spans more than k|V'|- hyperedges. We characterize (k,)-sparse hypergraphs in terms of graph theoretic, matroidal and algorithmic properties. We extend several well-known theorems of Haas, Lov\'asz, Nash-Williams, Tutte, and White and Whiteley, linking arboricity of graphs to certain counts on the number of edges. We also address the problem of finding lower-dimensional representations of sparse hypergraphs, and identify a critical behaviour in terms of the sparsity parameters k and . Our constructions extend the pebble games of Lee and Streinu from graphs to hypergraphs.

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