Searching in Euclidean Spaces with Predictions

Abstract

We study the problem of searching for a target at some unknown location in Rd when additional information regarding the position of the target is available in the form of predictions. In our setting, predictions come as approximate distances to the target: for each point p∈ Rd that the searcher visits, we obtain a value λ(p) such that |pt| λ(p) c· |pt|, where c 1 is a fixed constant, t is the position of the target, and |pt| is the Euclidean distance of p to t. The cost of the search is the length of the path followed by the searcher. Our main positive result is a strategy that achieves (10c)d+1-competitive ratio, even when the constant c is unknown. We also give a lower bound of roughly (c/4)d-1 on the competitive ratio of any search strategy in d, assuming that c 4.