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We present an algorithm for the c-approximate nearest neighbor problem in a d-dimensional Euclidean space, achieving query time of O(dn 1 c2/+o(1)) and space O(dn + n 1+1 c2/+o(1)). This almost matches the lower bound for hashing-based algorithm recently obtained in (R. Motwani et al., 2006). We also obtain a space-efficient version of the algorithm, which uses dn+n log O(1) n space, with a query time of dn O(1/c2) . Finally, we discuss practical variants of the algorithms that utilize fast bounded-distance decoders for the Leech lattice
Andoni et al. (Sun,) studied this question.