Finding monotone patterns in sublinear time

Abstract

We study the problem of finding monotone subsequences in an array from the viewpoint of sublinear algorithms. For fixed k ∈ N and > 0, we show that the non-adaptive query complexity of finding a length-k monotone subsequence of f [n] R, assuming that f is -far from free of such subsequences, is (( n) 2 k ). Prior to our work, the best algorithm for this problem, due to Newman, Rabinovich, Rajendraprasad, and Sohler (2017), made ( n)O(k2) non-adaptive queries; and the only lower bound known, of ( n) queries for the case k = 2, followed from that on testing monotonicity due to Erg\"un, Kannan, Kumar, Rubinfeld, and Viswanathan (2000) and Fischer (2004).