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Most Influential SIGMOD 2024 Paper · 2026-03 edition

RaBitQ: Quantizing High-Dimensional Vectors with A Theoretical Error Bound for Approximate Nearest Neighbor Search

Jianyang Gao; Cheng Long

Venue
ACM SIGMOD Conference (SIGMOD) 2024
Recognition
Most Influential SIGMOD 2024 Paper (Rank No. 5)
Edition
2026-03
Impact factor
3
Certificate ID
c7f773d6384b6da2

Abstract

Searching for approximate nearest neighbors (ANN) in the high-dimensional Euclidean space is a pivotal problem. Recently, with the help of fast SIMD-based implementations, Product Quantization (PQ) and its variants can often efficiently and accurately estimate the distances between the vectors and have achieved great success in the in-memory ANN search. Despite their empirical success, we note that these methods do not have a theoretical error bound and are observed to fail disastrously on some real-world datasets. Motivated by this, we propose a new randomized quantization method named RaBitQ, which quantizes D-dimensional vectors into D-bit strings. RaBitQ guarantees a sharp theoretical error bound and provides good empirical accuracy at the same time. In addition, we introduce efficient implementations of RaBitQ, supporting to estimate the distances with bitwise operations or SIMD-based operations. Extensive experiments on real-world datasets confirm that (1) our method outperforms PQ and its variants in terms of accuracy-efficiency trade-off by a clear margin and (2) its empirical performance is well-aligned with our theoretical analysis.

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