Deterministic MST Sparsification in the Congested Clique
Abstract
We give a simple deterministic constant-round algorithm in the congested clique model for reducing the number of edges in a graph to n1+ while preserving the minimum spanning forest, where > 0 is any constant. This implies that in the congested clique model, it is sufficient to improve MST and other connectivity algorithms on graphs with slightly superlinear number of edges to obtain a general improvement. As a byproduct, we also obtain a simple alternative proof showing that MST can be computed deterministically in O( n) rounds.
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