Paulo Goldfeld scite author profile

Paulo Goldfeld

5Publications

71Citation Statements Received

52Citation Statements Given

How they've been cited

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115

Affiliations

Federal University of Rio de Janeiro, Courant Institute of Mathematical Sciences

Publications

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Balancing Neumann-Neumann preconditioners for mixed approximations of heterogeneous problems in linear elasticity

Goldfeld

Pavarino

Widlund

2003

Numerische Mathematik

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Balancing Neumann-Neumann methods are extented to mixed formulations of the linear elasticity system with discontinuous coefficients, discretized with mixed finite or spectral elements with discontinuous pressures. These domain decomposition methods implicitly eliminate the degrees of freedom associated with the interior of each subdomain and solve iteratively the resulting saddle point Schur complement using a hybrid preconditioner based on a coarse mixed elasticity problem and local mixed elasticity problems with natural and essential boundary conditions. A polylogarithmic bound in the local number of degrees of freedom is proven for the condition number of the preconditioned operator in the constant coefficient case. Parallel and serial numerical experiments confirm the theoretical results, indicate that they still hold for systems with discontinuous coefficients, and show that our algorithm is scalable, parallel, and robust with respect to material 284 P. Goldfeld et al. heterogeneities. The results on heterogeneous general problems are also supported in part by our theory. Classification (1991): 65N55, 65N30, 65N35, 65F10, 65Y05 Mathematics Subject

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Supporting theory for a block approximate inverse preconditioner

Almeida

Cruz

Goldfeld³

et al. 2021

Linear Algebra and its Applications

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Balancing Neumann-Neumann Methods for Mixed Approximations of Linear Elasticity

Goldfeld

Pavarino

Widlund

2002

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Truncated conjugate gradient and improved LBFGS and TSVD for history matching

Dickstein¹,

Goldfeld²,

Pfeiffer

et al. 2017

Comput Geosci

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An algebraic ILU(k) based two-level domain decomposition preconditioner

Augusto¹,

Carvalho²,

Goldfeld³

et al. 2015

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With the ultimate goal of designing a scalable parallel preconditioner for reservoir simulation problems, we combine domain decomposition ideas (prove suitable for parallelization) with incomplete factorizations (which are standard in reservoir simulation) at subdomain level. We introduce an ILU(k)-based two-level domain decomposition preconditioner and compare its performance with a two-level ILU(k)-Block-Jacobi preconditioner.

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Paulo Goldfeld

Balancing Neumann-Neumann preconditioners for mixed approximations of heterogeneous problems in linear elasticity

Supporting theory for a block approximate inverse preconditioner

Balancing Neumann-Neumann Methods for Mixed Approximations of Linear Elasticity

Truncated conjugate gradient and improved LBFGS and TSVD for history matching

An algebraic ILU(k) based two-level domain decomposition preconditioner

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