𝓞(n³) implementation of the Hungarian algorithm, also known as the Hungarian method, Kuhn–Munkres algorithm or Munkres assignment. The Hungarian algorithm solved the minmum bipartite match problem in 𝓞(n⁴). By implementing the priority queue with a van Emde Boas tree the time can be reduced to 𝓞(n³ log log n). The van Emde Boas tree is possible to use because the elements values are bounded within the priority queue's capacity. However this implemention achived 𝓞(n³) by not using a priority queue. Edmonds and Karp, and ndependently Tomizawa, has also reduced the time complexity to 𝓞(n³), but I do not known how.