Randomized dimensionality reduction has been recognized as one of the cornerstones in handling high-dimensional data, originating in various foundational works such as the celebrated Johnson-Lindenstrauss Lemma. More specifically, nearest neighbor-preserving embeddings exist for ℓ2 (Euclidean) and ℓ1 (Manhattan) metrics, as well as doubling subsets of ℓ2, where doubling dimension is today the most effective way of capturing intrinsic dimensionality, as well as input structure in various applications. These randomized embeddings bound the distortion only for distances between the query point and a point set. Motivated by the foundational character of fast Approximate Nearest Neighbor search in ℓ1, this paper settles an important missing case...
Similarity search is a fundamental algorithmic primitive, widely used in many computer science disci...
Nonlinear dimensionality reduction methods often rely on the nearest-neighbors graph to extract low-...
The nearest neighbor problem is one of the most important problems in computational geometry. Many o...
International audienceRandomized dimensionality reduction has been recognized as one of the cornerst...
International audienceRandomized dimensionality reduction has been recognized as one of the fundamen...
Randomized dimensionality reduction has been recognized as one of the fundamental techniques in hand...
In this paper we introduce the notion of nearest neighbor preserving embeddings. These are randomize...
International audienceThe approximate nearest neighbor problem (e-ANN) in high dimensional Euclidean...
We consider the following problem, which arises in many database and web-based applications: Given a...
The approximate nearest neighbor problem (epsilon-ANN) in Euclidean settings is a fundamental questi...
Dimension reduction (DR) computes faithful low-dimensional (LD) representations of high-dimensional ...
Click on the DOI link to access the article (may not be free).The -d tree was one of the first spati...
The nearest neighbor problem is the following: Given a set of n points P = fp1�:::�p ng in some metr...
Given a set of n points in d-dimensional Euclidean space, S⊂Ed, and a query point qqqEd, we wish to ...
Given a set of n points in d-dimensional Euclidean space, S ⊂ E d, and a query point q ∈ E d, we wis...
Similarity search is a fundamental algorithmic primitive, widely used in many computer science disci...
Nonlinear dimensionality reduction methods often rely on the nearest-neighbors graph to extract low-...
The nearest neighbor problem is one of the most important problems in computational geometry. Many o...
International audienceRandomized dimensionality reduction has been recognized as one of the cornerst...
International audienceRandomized dimensionality reduction has been recognized as one of the fundamen...
Randomized dimensionality reduction has been recognized as one of the fundamental techniques in hand...
In this paper we introduce the notion of nearest neighbor preserving embeddings. These are randomize...
International audienceThe approximate nearest neighbor problem (e-ANN) in high dimensional Euclidean...
We consider the following problem, which arises in many database and web-based applications: Given a...
The approximate nearest neighbor problem (epsilon-ANN) in Euclidean settings is a fundamental questi...
Dimension reduction (DR) computes faithful low-dimensional (LD) representations of high-dimensional ...
Click on the DOI link to access the article (may not be free).The -d tree was one of the first spati...
The nearest neighbor problem is the following: Given a set of n points P = fp1�:::�p ng in some metr...
Given a set of n points in d-dimensional Euclidean space, S⊂Ed, and a query point qqqEd, we wish to ...
Given a set of n points in d-dimensional Euclidean space, S ⊂ E d, and a query point q ∈ E d, we wis...
Similarity search is a fundamental algorithmic primitive, widely used in many computer science disci...
Nonlinear dimensionality reduction methods often rely on the nearest-neighbors graph to extract low-...
The nearest neighbor problem is one of the most important problems in computational geometry. Many o...