Rational approximation is a powerful tool to obtain accurate surrogates for nonlinear functions that are easy to evaluate and linearize. The interpolatory adaptive Antoulas--Anderson (AAA) method is one approach to construct such approximants numerically. For large-scale vector- and matrix-valued functions, however, the direct application of the set-valued variant of AAA becomes inefficient. We propose and analyze a new sketching approach for such functions called sketchAAA that, with high probability, leads to much better approximants than previously suggested approaches while retaining efficiency. The sketching approach works in a black-box fashion where only evaluations of the nonlinear function at sampling points are needed. Numerical t...
We study the problem of constructing a linear sketch of minimum dimension that allows approximation ...
AbstractWe generalize our earlier results on rational interpolation which were given in Van Barel an...
This article proposes an efficient numerical method for solving nonlinear partial differential equat...
We develop algorithms that construct robust (i.e., reliable for a given tolerance and scaling indepe...
A new rational Krylov method for the efficient solution of nonlinear eigenvalue problems, A(λ)x = 0,...
A methodology for using random sketching in the context of model order reduction for high-dimensiona...
It is often desirable to reduce the dimensionality of a large dataset by projecting it onto a low-di...
This paper describes a suite of algorithms for constructing low-rank approximations of an input matr...
We present NLEIGS: a new rational Krylov method based on rational interpolation for solving the nonl...
A common way of finding the poles of a meromorphic function f in a domain, where an explicit express...
Abstract. A new rational Krylov method for the efficient solution of nonlinear eigenvalue problems, ...
AbstractClassical rational interpolation is known to suffer from several drawbacks, such as unattain...
The sketch-and-project, as a general archetypal algorithm for solving linear systems, unifies a vari...
AbstractConsider the black box interpolation of a τ-sparse, n-variate rational function f, where τ i...
Solutions to high-dimensional parameter-dependent problems are in great demand in the contemporary a...
We study the problem of constructing a linear sketch of minimum dimension that allows approximation ...
AbstractWe generalize our earlier results on rational interpolation which were given in Van Barel an...
This article proposes an efficient numerical method for solving nonlinear partial differential equat...
We develop algorithms that construct robust (i.e., reliable for a given tolerance and scaling indepe...
A new rational Krylov method for the efficient solution of nonlinear eigenvalue problems, A(λ)x = 0,...
A methodology for using random sketching in the context of model order reduction for high-dimensiona...
It is often desirable to reduce the dimensionality of a large dataset by projecting it onto a low-di...
This paper describes a suite of algorithms for constructing low-rank approximations of an input matr...
We present NLEIGS: a new rational Krylov method based on rational interpolation for solving the nonl...
A common way of finding the poles of a meromorphic function f in a domain, where an explicit express...
Abstract. A new rational Krylov method for the efficient solution of nonlinear eigenvalue problems, ...
AbstractClassical rational interpolation is known to suffer from several drawbacks, such as unattain...
The sketch-and-project, as a general archetypal algorithm for solving linear systems, unifies a vari...
AbstractConsider the black box interpolation of a τ-sparse, n-variate rational function f, where τ i...
Solutions to high-dimensional parameter-dependent problems are in great demand in the contemporary a...
We study the problem of constructing a linear sketch of minimum dimension that allows approximation ...
AbstractWe generalize our earlier results on rational interpolation which were given in Van Barel an...
This article proposes an efficient numerical method for solving nonlinear partial differential equat...