Add to ORKGLet Φ∈Rm x n be a sparse Johnson-Lindenstrauss transform [52] with column sparsity s. For a subset T of the unit sphere and ε∈(0,1/2), we study settings for m,s to ensure EΦ supx∈ T |Φ x|22 - 1| < ε, i.e. so that Φ preserves the norm of every x ∈ T simultaneously and multiplicatively up to 1+ε. We introduce a new complexity parameter, which depends on the geometry of T, and show that it suffices to choose s and m such that this parameter is small. Our result is a sparse analog of Gordon's theorem, which was concerned with a dense Φ having i.i.d. Gaussian entries. We qualitatively unify several results related to the Johnson-Lindenstrauss lemma, subspace embeddings, and Fourier-based restricted isometries. Our work also implies new results i...
ℓ_1 minimization is often used for recovering sparse signals from an under-determined linear system...
Given a dictionary Π and a signal ξ = Πx gen-erated by a few linearly independent columns of Π, clas...
Given a set P of n points and a constant k, we are interested in computing the persistent homology o...
Abstract. Let Φ ∈ Rm×n be a sparse Johnson-Lindenstrauss transform [KN14] with s non-zeroes per colu...
Let Φ∈Rm×n be a sparse Johnson–Lindenstrauss transform (Kane and Nelson in J ACM 61(1):4, 2014) with...
We give two different and simple constructions for dimensionality reduction in `2 via linear mapping...
We provide a deterministic construction of the sparse JohnsonLindenstrauss transform of Kane & Nelso...
For every n-point subset X of Euclidean space and target distortion 1+eps for 0l_2^m where f(x) = Ax...
In this paper, we present novel constructions of matrices with the restricted isometry property (RIP...
This paper considers compressed sensing and affine rank minimization in both noiseless and noisy cas...
We give near-tight lower bounds for the sparsity required in several dimensionality reducing linear ...
The Johnson-Lindenstrauss Lemma asserts that a set of n points in any Euclidean space can be mapped ...
This paper considers compressed sensing and affine rank minimization in both noiseless and noisy cas...
Johnson and Lindenstrauss (1984) proved that any finite set of data in a high dimensional space can b...
Analysis sparsity is a common prior in inverse problem or machine learning including special cases s...
ℓ_1 minimization is often used for recovering sparse signals from an under-determined linear system...
Given a dictionary Π and a signal ξ = Πx gen-erated by a few linearly independent columns of Π, clas...
Given a set P of n points and a constant k, we are interested in computing the persistent homology o...
Abstract. Let Φ ∈ Rm×n be a sparse Johnson-Lindenstrauss transform [KN14] with s non-zeroes per colu...
Let Φ∈Rm×n be a sparse Johnson–Lindenstrauss transform (Kane and Nelson in J ACM 61(1):4, 2014) with...
We give two different and simple constructions for dimensionality reduction in `2 via linear mapping...
We provide a deterministic construction of the sparse JohnsonLindenstrauss transform of Kane & Nelso...
For every n-point subset X of Euclidean space and target distortion 1+eps for 0l_2^m where f(x) = Ax...
In this paper, we present novel constructions of matrices with the restricted isometry property (RIP...
This paper considers compressed sensing and affine rank minimization in both noiseless and noisy cas...
We give near-tight lower bounds for the sparsity required in several dimensionality reducing linear ...
The Johnson-Lindenstrauss Lemma asserts that a set of n points in any Euclidean space can be mapped ...
This paper considers compressed sensing and affine rank minimization in both noiseless and noisy cas...
Johnson and Lindenstrauss (1984) proved that any finite set of data in a high dimensional space can b...
Analysis sparsity is a common prior in inverse problem or machine learning including special cases s...
ℓ_1 minimization is often used for recovering sparse signals from an under-determined linear system...
Given a dictionary Π and a signal ξ = Πx gen-erated by a few linearly independent columns of Π, clas...
Given a set P of n points and a constant k, we are interested in computing the persistent homology o...