By James R. Driscoll, Harold N. Gabow, Ruth Shrairman, Robert E. Tarjan
Communications of the ACM,
November 1988,
Vol. 31 No. 11, Pages 1343-1354
10.1145/50087.50096
Comments
The relaxed heap is a priority queue data structure that achieves the same amortized time bounds as the Fibonacci heap—a sequence of m decrease_key and n delete_min operations takes time O(m + n log n). A variant of relaxed heaps achieves similar bounds in the worst case—O(1) time for decrease_key and O(log n) for delete_min. Relaxed heaps give a processor-efficient parallel implementation of Dijkstra's shortest path algorithm, and hence other algorithms in network optimization. A relaxed heap is a type of binomial queue that allows heap order to be violated.
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