Question

Ahuja et al. found that using a van Emde Boas tree reduces the complexity of this problem to “big O of m log log C” when certain values are bounded by C. For hidden Markov models, the Viterbi algorithm essentially solves this problem with probabilistic weights added. Fredman and Tarjan used Fibonacci heaps to find the asymptotically fastest known algorithm for one form of this problem, improving on Johnson’s algorithm. The Floyd–Warshall algorithm solves this problem for multiple sources. A priority queue is typically used to store unvisited items in a “big O of m log n” (-5[1])algorithm for this task. The Bellman–Ford algorithm works (10[1])for this problem (10[1])even if edge weights are negative, unlike Dijkstra’s (10[1])algorithm. For 10 points, name this problem of finding the minimum-distance route between two (-5[1])vertices of a graph. ■END■ (10[2]0[1])

ANSWER: shortest path problem [accept pathfinding]
<Other Science>
= Average correct buzz position

Back to tossups

Buzzes

PlayerTeamOpponentBuzz PositionValue
Rahul KumarRice ATexas A&M B96-5
Akshay SeetharamClaremont AUW A10410
Shantanu ThoratTexas A&M ASorbonne10710
Matthew WangUBC ATexas A11510
Jason ThieuMichigan State AIowa A129-5
Ryan DunnIowa BAppalachian State13410
Roan DowlingIowa AMichigan State A1340
Dimitris KalafatisTexas A&M BRice A13410

Summary

2024 ACF Regionals @ Berkeley01/27/2024Y1100%0%0%71.00
2024 ACF Regionals @ JMU01/27/2024Y1100%0%0%134.00
2024 ACF Regionals @ JMU01/27/2024Y1100%0%0%83.00
2024 ACF Regionals @ Nebraska01/27/2024Y683%0%33%118.80
2024 ACF Regionals @ Imperial01/27/2024Y888%0%50%115.57
2024 ACF Regionals @ Vanderbilt01/27/2024Y1100%0%0%116.00
2024 ACF Regionals @ MIT01/27/2024Y367%0%100%134.00