Approximate Sorting

We show that any comparison based, randomized algorithm to approximate any given ranking of n items within expected Spearman's footrule distance n ^{2} /ν(n) needs at least

n (min{log ν(n), log n} − 6)

comparisons in the worst case. This bound is tight up to a constant factor since there exists a deterministic algorithm that shows that 6n log (n) comparisons are always sufficient.