In solving a linear system with iterative methods, one is usually confronted with the dilemma of having to choose between cheap, inefficient iterates over sparse search directions (e.g., coordinate descent), or expensive iterates in well-chosen search directions (e.g., conjugate gradients). In this paper, we propose to interpolate between these two extremes, and show how to perform cheap iterations along nonsparse search directions, provided that these directions can be extracted from a new kind of sparse factorization. For example, if the search directions are the columns of a hierarchical matrix, then the cost of each iteration is typically logarithmic in the number of variables. Using some graph-theoretical results on low-stretch spanning ...
These notes are not necessarily an accurate representation of what happened in class. The notes writ...
The standard LU factorization-based solution process for linear systems can be enhanced in speed or ...
We analyze the practical efficiency of multi-iterative techniques for the numerical solution of gra...
In solving a linear system with iterative methods, one is usually confronted with the dilemma of hav...
We study distributed algorithms built around minor-based vertex sparsifiers, and give the first algo...
An over view of advanced techniques for solving large sparse linear systems of equations is presente...
This work will appear as an extended abstract in the Proc. of the 14th International Symposium on Ex...
Solving Laplacian linear systems is an important task in a variety of practical and theoretical appl...
Linear system solving is a main workhorse in applied mathematics. Recently, theoretical computer sci...
As sequential computers seem to be approaching their limits in CPU speed there is increasing intere...
Spectral graph sparsification aims to find an ultra-sparse subgraph whose Laplacian matrix can well ...
Abstract. Numerical linear algebra and combinatorial optimization are vast subjects; as is their int...
AbstractWe consider the problem of approximate solution x̄ of of a linear system Ax = b over the rea...
<p>Spectral graph theory is the interplay between linear algebra and combinatorial graph theory. Lap...
We consider the problem of approximate solution ex of a linear system Ax = b over the reals, such th...
These notes are not necessarily an accurate representation of what happened in class. The notes writ...
The standard LU factorization-based solution process for linear systems can be enhanced in speed or ...
We analyze the practical efficiency of multi-iterative techniques for the numerical solution of gra...
In solving a linear system with iterative methods, one is usually confronted with the dilemma of hav...
We study distributed algorithms built around minor-based vertex sparsifiers, and give the first algo...
An over view of advanced techniques for solving large sparse linear systems of equations is presente...
This work will appear as an extended abstract in the Proc. of the 14th International Symposium on Ex...
Solving Laplacian linear systems is an important task in a variety of practical and theoretical appl...
Linear system solving is a main workhorse in applied mathematics. Recently, theoretical computer sci...
As sequential computers seem to be approaching their limits in CPU speed there is increasing intere...
Spectral graph sparsification aims to find an ultra-sparse subgraph whose Laplacian matrix can well ...
Abstract. Numerical linear algebra and combinatorial optimization are vast subjects; as is their int...
AbstractWe consider the problem of approximate solution x̄ of of a linear system Ax = b over the rea...
<p>Spectral graph theory is the interplay between linear algebra and combinatorial graph theory. Lap...
We consider the problem of approximate solution ex of a linear system Ax = b over the reals, such th...
These notes are not necessarily an accurate representation of what happened in class. The notes writ...
The standard LU factorization-based solution process for linear systems can be enhanced in speed or ...
We analyze the practical efficiency of multi-iterative techniques for the numerical solution of gra...