Parallel Reachability and Shortest Paths on Non-sparse Digraphs: Near-linear Work and Sub-square-root Depth
Abstract
We present parallel algorithms for computing single-source reachability and shortest paths on directed n-vertex m-edge graphs using near-linear O(m) work and o(n) depth whenever m n1+o(1). At the extreme of m=(n2), our reachability and shortest path algorithms have depth only n0.136 and n0.25+o(1), respectively. The state-of-the-art parallel algorithms with near-linear work for both problems require (n) depth in all density regimes.
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