Domain Decomposition Methods and Preconditioning

Korneev, V. G.; Langer, Ulrich

doi:10.1002/0470091355.ecm019

Cited by 21 publications

(14 citation statements)

References 75 publications

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“…These methods can be applied in problems that involve different physics at each subdomain, for example, fluid-structure interaction [15][16][17][18][19] and in problems comprising several subdomains with the same underlying physics, for example, contact mechanics [20,21]. Another field of application of the DDMs is parallel computing [22], where the domain is decomposed out of computational reasons and not because of problem setting itself. Generally, the DDMs can be distinguished into overlapping and non-overlapping.…”

mentioning

confidence: 99%

A Nitsche-type formulation and comparison of the most common domain decomposition methods in isogeometric analysis

Apostolatos

Schmidt

Wüchner

et al. 2013

Int. J. Numer. Meth. Engng

163

149

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SUMMARYThis paper provides a detailed elaboration and assessment of the most common domain decomposition methods for their application in isogeometric analysis. The methods comprise a penalty approach, Lagrange multiplier methods, and a Nitsche-type method. For the Nitsche method, a new stabilized formulation is developed in the context of isogeometric analysis to guarantee coercivity. All these methods are investigated on problems of linear elasticity and eigenfrequency analysis in 2D. In particular, focus is put on non-uniform rational B-spline patches which join nonconformingly along their common interface. Thus, the application of isogeometric analysis is extended to multi-patches, which can have an arbitrary parametrization on the adjacent edges. Moreover, it has been shown that the unique properties provided by isogeometric analysis, that is, high-order functions and smoothness across the element boundaries, carry over for the analysis of multiple domains.

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mentioning

confidence: 99%

A Nitsche-type formulation and comparison of the most common domain decomposition methods in isogeometric analysis

Apostolatos

Schmidt

Wüchner

et al. 2013

Int. J. Numer. Meth. Engng

163

149

View full text Add to dashboard Cite

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“…they only contribute to proper understanding and emphasize the generality of this iterative algorithm. It should also be mentioned that very popular single or multiple preconditioning [13,14] can be interpreted using (one or several) coordinate vectors. For this procedure, the preconditioning does not imply any significant change of the algorithm (cf.…”

Section: Special Cases Of the Methodsmentioning

confidence: 99%

“…it is sufficient to differentiate the energy increase (13) If the generalized Ritz stiffness matrix is introduced (14) which is also symmetric, and in the case of linearly independent coordinate vectors also positive definite, and if the generalized Ritz load vector is defined as (15) the energy increase can be written in an abbreviated form (16) to which after minimization (differentiation) according to , the following equation system can be related (17) In the sense of the Ritz method, this system is used to approximate the initial one (1). As the approximation is usually unsatisfactory, an iterative improvement should be made.…”

Section: Iteration Ideamentioning

confidence: 99%

Iterated Ritz procedure for solving linear algebraic equations systems

2017

JCE

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The paper describes research state of a new iterative method for solving systems of linear algebraic equations. The method is suitable for extremely large systems with sparse matrices. In addition to its own characteristics, it also has a feature of generality, as many iterative methods are only special cases of this approach. The algorithm was developed independently, and then implemented into the open source code program FEAP. Also, various checks were conducted, especially on practical models. Although the method has been only partially studied, good results have already been obtained. Iteririertes Ritz-Verfahren zur Lösung von linearen GleichungssystemenIn der Arbeit wird der aktuelle Entwicklungsstand des neuen Iterationsverfahrens für die Lösung von linearen Gleichungssystemen beschrieben. Das Verfahren eignet sich insbesondere für sehr große Systeme mit schwach gefüllten Matrizen. Es besitzt neben eigenen Merkmalen auch das Merkmal der Allgemeinheit, da viele Iterationsverfahren nur ein Spezialfall dieses Ansatzes sind. Der Algorithmus wurde selbständig ermittelt und danach dem FEAP Programm mit einem offenen Programmcode zugeordnet. Es wurden auch zahlreiche Prüfungen vorgenommen, insbesondere an praktischen Modellen. Obwohl das Verfahren erst teilweise untersucht wurde, zeigt es gute Ergebnisse. Schlüsselwörter:Iterationsverfahren, Jacobi-Verfahren, Gauß-Seidel-Verfahren, Methode des steilsten Abstiegs, Methode der konjugierten Gradienten

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“…The use of overlapping subdomains helps us to evade using a sophisticated mesh generation algorithm as the preprocessor. In this regard, here, we follow the multiplicative Schwarz algorithm, which is an iterative one (see the work of Korneev and Langer for more details). The formulation starts with assuming that Ω d in is formed by the union of a set of subdomains.…”

Section: Domain Decomposition With Overlapping Subdomainsmentioning

confidence: 99%

A robust time‐space formulation for large‐scale scalar wave problems using exponential basis functions

Movahedian

Boroomand

Mansouri

2018

Numerical Meth Engineering

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Summary In this paper, a new effective boundary node method is presented for the solution of acoustic problems, directly in time domain, using exponential basis functions. Unlike many other methods using boundary information, the final coefficient matrix is sparse. The formulation is well suited for domains whose extent is relatively larger than the distance traveled by the acoustic wave in an increment of time. The exponential basis functions used satisfy the time‐space governing equation. This helps to choose a relatively large time increment and a moderate number of boundary points, which leads to reduction of computation time. The computation is performed incrementally using a weighted residual in time. Through a series of numerical examples, it is shown that the method, when combined with a domain decomposition strategy, is effectively capable of solving various 1‐ to 3‐dimensional acoustic problems.

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Domain Decomposition Methods and Preconditioning

Cited by 21 publications

References 75 publications

A Nitsche-type formulation and comparison of the most common domain decomposition methods in isogeometric analysis

A Nitsche-type formulation and comparison of the most common domain decomposition methods in isogeometric analysis

Iterated Ritz procedure for solving linear algebraic equations systems

A robust time‐space formulation for large‐scale scalar wave problems using exponential basis functions

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