A Kronecker product approximate preconditioner for SANs

Langville, Amy N.; Stewart, William J.

doi:10.1002/nla.344

Cited by 42 publications

(56 citation statements)

References 24 publications

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“…As the Picard iteration converges, the linear systems converge more quickly, but it still needs about 2000 iterations for the last Picard iteration step. Compared by the computation time, we find that GMRES (20) with tridiagonal preconditioner is 15 times faster than GMRES (20) without preconditioning, and GMRES (20) with constraint preconditioner is 24 times faster. And again the constraint preconditioner has better convergence behavior than the block tridiagonal preconditioner.…”

Section: Navier-stokes Problemmentioning

confidence: 95%

“…The number of iteration steps is 6 or 8 times larger than that of KPA preconditioners. Figure 5(a) shows the corresponding residual curves of GMRES (20). Compared with its original residual curve, both KPA preconditioner and ILU preconditioner greatly improve the convergence.…”

Section: Stokes Problemmentioning

confidence: 99%

“…Hence a vrey used approach is to seek problem specific methods. For example, in stochastic automata networks (SANs) [20], the authors choose a Kronecker product preconditioner as P = G ⊗ F .…”

Section: Introductionmentioning

confidence: 99%

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Kronecker product approximation preconditioners for convection–diffusion model problems

Xiang

Grigori

2010

Numerical Linear Algebra App

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Abstract:We consider the preconditioning of linear systems arising from four convection-diffusion model problems: scalar convection-diffusion problem, Stokes problem, Oseen problem, and NavierStokes problem. For these problems we identify an explicit Kronecker product structure of the coefficient matrices, in particular for the convection term. For the latter three model cases, the coefficient matrices have a 2 × 2 block structure, where each block is a Kronecker product or a summation of several Kronecker products. We use these structures to design a diagonal block preconditioner, a tridiagonal block preconditioner and a constraint preconditioner. The constraint preconditioner can be regarded as the modification of the tridiagonal block preconditioner and of the diagonal block preconditioner based on the cell Reynolds number. For this reason, the constraint preconditioner is usually more efficient. We also give numerical examples to show the efficiency of these preconditioners.

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Section: Navier-stokes Problemmentioning

confidence: 95%

Section: Stokes Problemmentioning

confidence: 99%

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Kronecker product approximation preconditioners for convection–diffusion model problems

Xiang

Grigori

2010

Numerical Linear Algebra App

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“…Recently, we discovered a nearest Kronecker product (NKP) preconditioner for SANs [8]. The initial results for the NKP preconditioner look promising [7,9].…”

Section: Preconditioning For Sanmentioning

confidence: 99%

The Kronecker product and stochastic automata networks

Langville

2004

Journal of Computational and Applied Mathematics

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This paper can be thought of as a companion paper to Van Loan's The Ubiquitous Kronecker Product paper (J. Comput. Appl. Math. 123 (2000) 85). We collect and catalog the most useful properties of the Kronecker product and present them in one place. We prove several new properties that we discovered in our search for a stochastic automata network preconditioner. We conclude by describing one application of the Kronecker product, omitted from Van Loan's list of applications, namely stochastic automata networks.

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“…In the last 10 years, interest in tensor decompositions has expanded to many fields, such as signal processing [1], numerical linear algebra [3], computer vision [4], numerical analysis [5], data mining [6], graphic analysis [7], neuroscience, communication and so on. Moreover, the adaptive algorithms to track CP decomposition is also researched.…”

Section: Introductionmentioning

confidence: 99%

CP Decomposition and Its Application in Noise Reduction and Multiple Sources Identification

Li¹,

Feng²,

Liu³

et al. 2015

Proceedings of the 2015 International Conference on Computer Science and Intelligent Communication

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The CANDECOMP/PARAFAC (Canonical Decomposition / Parallel Factor Analysis, ab. CP) decomposition of a higherorder tensor is a powerful multilinear algebra, thus denoising observed data and identification of multiple sources can both be accomplished by the CP decomposition. In this paper, images are used to illustrate the denoising effect of CP decomposition. To identify sources, the number of senors affects the accuracy and convergence of algorithm greatly, especially, if the angle difference is smaller the problem would be worse. So, we concern to improve the accuracy of the identification of close sources with CP decomposition. By searching for the optimal number of sensors and denoising the original data by CP beforehand, the fewer number of sensors could be used and the accuracy is improved. Simulation results show that our technique outperforms good performances in both denoising data and identification of close sources.

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A Kronecker product approximate preconditioner for SANs

Cited by 42 publications

References 24 publications

Kronecker product approximation preconditioners for convection–diffusion model problems

Kronecker product approximation preconditioners for convection–diffusion model problems

The Kronecker product and stochastic automata networks

CP Decomposition and Its Application in Noise Reduction and Multiple Sources Identification

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