Linear Search with Probabilistic Detection and Variable Speeds
Discrete Mathematics
2025-05-15 v1
Abstract
We present results on new variants of the famous linear search (or cow-path) problem that involves an agent searching for a target with unknown position on the infinite line. We consider the variant where the agent can move either at speed or at a slower speed . When traveling at the slower speed , the agent is guaranteed to detect the target upon passing through its location. When traveling at speed , however, the agent, upon passing through the target's location, detects it with probability . We present algorithms and provide upper bounds for the competitive ratios for three cases separately: when , , and when . We also prove that the provided algorithm for the case is optimal.
Cite
@article{arxiv.2505.09429,
title = {Linear Search with Probabilistic Detection and Variable Speeds},
author = {Jared Coleman and Oscar Morales-Ponce},
journal= {arXiv preprint arXiv:2505.09429},
year = {2025}
}