Lower bounds for finding the maximum and minimum elements with k lies

Abstract

In this paper we deal with the problem of finding the smallest and the largest elements of a totally ordered set of size n using pairwise comparisons if k of the comparisons might be erroneous where k is a fixed constant. We prove that at least (k+1.5)n+(k) comparisons are needed in the worst case thus disproving the conjecture that (k+1+ε)n comparisons are enough.