AF-heap

In computer science, the AF-heap is a type of priority queue for integer data, an extension of the fusion tree using an atomic heap proposed by M. L. Fredman and D. E. Willard.^[1]

Using an AF-heap, it is possible to perform $m$ insert or decrease-key operations and $n$ delete-min operations on machine-integer keys in time $O (m + n log n / log log n)$ . This allows Dijkstra's algorithm to be performed in the same $O (m + n log n / log log n)$ time bound on graphs with $n$ edges and $m$ vertices, and leads to a linear time algorithm for minimum spanning trees, with the assumption for both problems that the edge weights of the input graph are machine integers in the transdichotomous model.

References

^ M. L. Fredman and D. E. Willard. Trans-dichotomous algorithms for minimum spanning trees and shortest paths. Journal of Computer and System Sciences 48, 533-551 (1994)

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[Willard-1] M. L. Fredman and D. E. Willard. Trans-dichotomous algorithms for minimum spanning trees and shortest paths. Journal of Computer and System Sciences 48, 533-551 (1994)

[1]

See also

References