Component-Averaged Row Projections: A Robust, Block-Parallel Scheme for Sparse Linear Systems

Gordon, Dan; Gordon, Rachel

doi:10.1137/040609458

Cited by 84 publications

(81 citation statements)

References 28 publications

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“…For w i = 1, this is the CARP1 algorithm of [13] (see also [11,8,9]). The simultaneous DROP algorithm of [7] requires only that the weights w i be positive, but dividing each w i by their maximum, max i {w i }, while multiplying each λ k by the same maximum,…”

Section: Some Convergence Resultsmentioning

confidence: 99%

“…Convergence of CAV then follows, as does convergence of several other methods, including the ART, Landweber's method, the SART [1], the block-iterative CAV (BICAV) [9], the CARP1 method of Gordon and Gordon [13], and a block-iterative variant of CARP1 obtained from the DROP method of Censor et al [7]. Convergence of most of these methods was also established in [15], using a unifying framework of a block-iterative Landweber algorithm, but without deriving upper bounds for the largest eigenvalue of a general A † A.…”

Section: Introduction and Notationmentioning

confidence: 99%

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Bounds on the largest singular value of a matrix and the convergence of simultaneous and block‐iterative algorithms for sparse linear systems

Byrne¹

2009

Int Trans Operational Res

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We obtain the following upper bounds for the eigenvalues of the matrix A † A. For any a in the interval [0, 2] letand c a and r a the maxima of the c aj and r ai , respectively. Then no eigenvalue of the matrix A † A exceeds the maximum ofover all j. Therefore, no eigenvalue of A † A exceeds c a r a .Using these bounds, it follows that, for the matrix G with entriesno eigenvalue of G † G exceeds one, provided that, for some a in the interval [0, 2], we have α i ≤ r −1 ai , and β j ≤ c −1 aj . Using this result, we obtain convergence theorems for several iterative algorithms for solving the problem Ax = b, including the CAV, BICAV, CARP1, SART, SIRT, and the block-iterative DROP and SART methods.

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Section: Some Convergence Resultsmentioning

confidence: 99%

Section: Introduction and Notationmentioning

confidence: 99%

Bounds on the largest singular value of a matrix and the convergence of simultaneous and block‐iterative algorithms for sparse linear systems

Byrne¹

2009

Int Trans Operational Res

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“…Gordon and Gordon [23] introduced an alternative way to combined the intermediate vectors x k,1 , . .…”

Section: Block-parallel Methodsmentioning

confidence: 99%

Multicore Performance of Block Algebraic Iterative Reconstruction Methods

Sørensen¹,

Hansen²

2014

SIAM J. Sci. Comput.

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Abstract. Algebraic iterative methods are routinely used for solving the ill-posed sparse linear systems arising in tomographic image reconstruction. Here we consider the Algebraic Reconstruction Techniques (ART) and the Simultaneous Iterative Reconstruction Techniques (SIRT), both of which rely on semi-convergence. Block versions of these methods, based on a partitioning of the linear system, are able to combine the fast semi-convergence of ART with the better multi-core properties of SIRT. These block methods separate into two classes: those that, in each iteration, access the blocks in a sequential manner, and those that compute a result for each block in parallel and then combine these results before the next iteration. The goal of this work is to demonstrate which block methods are best suited for implementation on modern multi-core computers. To compare the performance of the different block methods we use a fixed relaxation parameter in each method, namely, the one that leads to the fastest semi-convergence. Computational results show that for multi-core computers, the sequential approach is preferable.

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“…The latter does not make these approaches very attractive for inversion since the medium parameters will change from one iteration to the next, possibly requiring the tuning parameters to be changed as well. Instead, we use CARP-CG [14,15], a generic, iterative solution technique for sparse linear systems based on the CGMN method [5]. Convergence of this method is guaranteed, making it an attractive solver for inversion purposes.…”

Section: Iterative Solvermentioning

confidence: 99%

“…Although these expressions are convenient for analysis and testing, a more efficient implementation computes only the action of these matrices using Algorithm 1 as Qu + Rs = DKSWP(A, u, s, γ) [14].…”

Section: Cgmnmentioning

confidence: 99%

3D Frequency-Domain Seismic Inversion with Controlled Sloppiness

Leeuwen¹,

Herrmann²

2014

SIAM J. Sci. Comput.

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Abstract. Seismic waveform inversion aims at obtaining detailed estimates of subsurface medium parameters, such as the spatial distribution of soundspeed, from multiexperiment seismic data. A formulation of this inverse problem in the frequency domain leads to an optimization problem constrained by a Helmholtz equation with many right-hand sides. Application of this technique to industry-scale problems faces several challenges: First, we need to solve the Helmholtz equation for high wave numbers over large computational domains. Second, the data consist of many independent experiments, leading to a large number of PDE solves. This results in high computational complexity both in terms of memory and CPU time as well as input/output costs. Finally, the inverse problem is highly nonlinear and a lot of art goes into preprocessing and regularization. Ideally, an inversion needs to be run several times with different initial guesses and/or tuning parameters. In this paper, we discuss the requirements of the various components (PDE solver, optimization method, . . . ) when applied to large-scale three-dimensional seismic waveform inversion and combine several existing approaches into a flexible inversion scheme for seismic waveform inversion. The scheme is based on the idea that in the early stages of the inversion we do not need all the data or very accurate PDE solves. We base our method on an existing preconditioned Krylov solver (CARP-CG) and use ideas from stochastic optimization to formulate a gradient-based (quasi-Newton) optimization algorithm that works with small subsets of the right-hand sides and uses inexact PDE solves for the gradient calculations. We propose novel heuristics to adaptively control both the accuracy and the number of right-hand sides. We illustrate the algorithms on synthetic benchmark models for which significant computational gains can be made without being sensitive to noise and without losing the accuracy of the inverted model. 1. Introduction. Detailed estimates of subsurface properties such as soundspeed and density can be obtained from seismic data by solving a PDE-constrained optimization problem [44]-also known as full-waveform inversion (FWI) in the seismic community-that involves multiple source experiments. The data in this setting consist of a collection of time series for many source-receiver pairs and are the result of either passive or active source experiments. The PDE is a wave equation with as many right-hand sides as there are sources. Applications of this technique include oil and gas exploration and global seismology. A common characteristic of these applications is the need to propagate the waves over large distances (i.e., several hundred wavelenghts) through strongly inhomogeneous media for a large number of sources.

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Component-Averaged Row Projections: A Robust, Block-Parallel Scheme for Sparse Linear Systems

Cited by 84 publications

References 28 publications

Bounds on the largest singular value of a matrix and the convergence of simultaneous and block‐iterative algorithms for sparse linear systems

Bounds on the largest singular value of a matrix and the convergence of simultaneous and block‐iterative algorithms for sparse linear systems

Multicore Performance of Block Algebraic Iterative Reconstruction Methods

3D Frequency-Domain Seismic Inversion with Controlled Sloppiness

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