Maximum Selection and Ranking under Noisy Comparisons

Abstract

We consider (ε,δ)-PAC maximum-selection and ranking for general probabilistic models whose comparisons probabilities satisfy strong stochastic transitivity and stochastic triangle inequality. Modifying the popular knockout tournament, we propose a maximum-selection algorithm that uses O(nε2 1δ) comparisons, a number tight up to a constant factor. We then derive a general framework that improves the performance of many ranking algorithms, and combine it with merge sort and binary search to obtain a ranking algorithm that uses O(n n ( n)3ε2) comparisons for any δ1n, a number optimal up to a ( n)3 factor.