Tight Bounds for Blind Search on the Integers

Abstract

We analyze a simple random process in which a token is moved in the interval A=\0,...,n\: Fix a probability distribution μ over \1,...,n\. Initially, the token is placed in a random position in A. In round t, a random value d is chosen according to μ. If the token is in position a≥ d, then it is moved to position a-d. Otherwise it stays put. Let T be the number of rounds until the token reaches position 0. We show tight bounds for the expectation of T for the optimal distribution μ. More precisely, we show that μ\Eμ(T)\=(( n)2). For the proof, a novel potential function argument is introduced. The research is motivated by the problem of approximating the minimum of a continuous function over [0,1] with a ``blind'' optimization strategy.