We show how to solve a number of problems in numerical linear algebra, such as least squares regression, lp-regression for any p ≥ 1, low rank approximation, and kernel regression, in time T(A)poly(log(nd)), where for a given input matrix A ∈ Rn×d, T(A) is the time needed to compute A · y for an arbitrary vector y ∈ Rd. Since T(A) ≤ O(nnz(A)), where nnz(A) denotes the number of non-zero entries of A, the time is no worse, up to polylogarithmic factors, as all of the recent advances for such problems that run in input-sparsity time. However, for many applications, T(A) can be much smaller than nnz(A), yielding significantly sublinear time algorithms. For example, in the overconstrained (1+ε)-approximate polynomial interpolation problem, A is...
International audienceThe class of quasiseparable matrices is defined by a pair of bounds, called th...
We estimate the Boolean complexity of multiplication of structured matrices by a vector and the solu...
Under a standard assumption in complexity theory (NP ̸ ⊂ P/poly), we demonstrate a gap between the m...
We give sublinear-time approximation algorithms for some optimization problems arising in machine le...
We study sublinear algorithms that solve linear systems locally. In the classical version of this pr...
We show that any n × n matrix A over any finite semiring can be preprocessed in O(n 2+ε) time, such ...
Motivated by the desire to extend fast randomized techniques to nonlinear lp re-gression, we conside...
We design a sublinear-time approximation algorithm for quadratic function minimization problems with...
Multipoint polynomial evaluation and interpolation are fundamental for modern algebraic and numerica...
We give a parallel algorithm for computing all row minima in a totally monotone $n\times n$ matrix w...
Oblivious low-distortion subspace embeddings are a crucial building block for numerical linear algeb...
Low-distortion embeddings are critical building blocks for developing random sampling and random pro...
Abstract. Many real-world problems require graphs of such large size that polynomial time algorithms...
We present an improved algorithm for solving symmetrically diagonally dominant linear systems. On in...
Oblivious low-distortion subspace embeddings are a crucial building block for numerical linear al-ge...
International audienceThe class of quasiseparable matrices is defined by a pair of bounds, called th...
We estimate the Boolean complexity of multiplication of structured matrices by a vector and the solu...
Under a standard assumption in complexity theory (NP ̸ ⊂ P/poly), we demonstrate a gap between the m...
We give sublinear-time approximation algorithms for some optimization problems arising in machine le...
We study sublinear algorithms that solve linear systems locally. In the classical version of this pr...
We show that any n × n matrix A over any finite semiring can be preprocessed in O(n 2+ε) time, such ...
Motivated by the desire to extend fast randomized techniques to nonlinear lp re-gression, we conside...
We design a sublinear-time approximation algorithm for quadratic function minimization problems with...
Multipoint polynomial evaluation and interpolation are fundamental for modern algebraic and numerica...
We give a parallel algorithm for computing all row minima in a totally monotone $n\times n$ matrix w...
Oblivious low-distortion subspace embeddings are a crucial building block for numerical linear algeb...
Low-distortion embeddings are critical building blocks for developing random sampling and random pro...
Abstract. Many real-world problems require graphs of such large size that polynomial time algorithms...
We present an improved algorithm for solving symmetrically diagonally dominant linear systems. On in...
Oblivious low-distortion subspace embeddings are a crucial building block for numerical linear al-ge...
International audienceThe class of quasiseparable matrices is defined by a pair of bounds, called th...
We estimate the Boolean complexity of multiplication of structured matrices by a vector and the solu...
Under a standard assumption in complexity theory (NP ̸ ⊂ P/poly), we demonstrate a gap between the m...