Super-convergent implicit–explicit Peer methods with variable step sizes

Schneider, Moritz; Lang, Jens; Weiner, Rüdiger

doi:10.1016/j.cam.2019.112501

Cited by 9 publications

(8 citation statements)

References 25 publications

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“…The theory of partitioned GLMs was formalized in [20] and different families of methods based on this structure have been reported in [21][22][23][24]. More recent high order IMEX-GLMs found in the literature [25][26][27] are based on Diagonally Implicit Multistage Integration Methods (DIMSIMs), Two-Step Runge-Kutta methods, and Peer methods providing various accuracy and stability enhancements.…”

Section: Introductionmentioning

confidence: 99%

Alternating directions implicit integration in a general linear method framework

Sarshar

Roberts

Sandu

2021

Journal of Computational and Applied Mathematics

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Alternating Directions Implicit (ADI) integration is an operator splitting approach to solve parabolic and elliptic partial differential equations in multiple dimensions based on solving sequentially a set of related one-dimensional equations. Classical ADI methods have order at most two, due to the splitting errors. Moreover, when the time discretization of stiff one-dimensional problems is based on Runge-Kutta schemes, additional order reduction may occur. This work proposes a new ADI approach based on the partitioned General Linear Methods framework. This approach allows the construction of high order ADI methods. Due to their high stage order, the proposed methods can alleviate the order reduction phenomenon seen with other schemes. Numerical experiments are shown to provide further insight into the accuracy, stability, and applicability of these new methods.

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Section: Introductionmentioning

confidence: 99%

Alternating directions implicit integration in a general linear method framework

Sarshar

Roberts

Sandu

2021

Journal of Computational and Applied Mathematics

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“…There is a wide range of literature concerning the different aspects of Peer methods and we will only give a short overview. More details can be found in the introductory chapters of [9,10]. Peer methods were introduced by Schmitt and Weiner in 2004 [8].…”

Section: Introductionmentioning

confidence: 99%

“…An alternative construction using partitioned methods is given in [11,16]. Since the coefficient matrices of Peer methods offer many degrees of freedom, the construction of super-convergent schemes [9,13,15] and the adaptation to variable step sizes [10,12] is possible.…”

Section: Introductionmentioning

confidence: 99%

“…For the sake of notation, we use for an s × s matrix M the same symbol for its Kronecker product with the m × m identity matrix M ⊗ I m as a mapping from the space R s•m to itself. An extensive analysis of consistency and stability along with the construction of super-convergent methods as well as the adaption to variable step sizes is given in [9,10].…”

Section: Introductionmentioning

confidence: 99%

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Well-Balanced and Asymptotic Preserving IMEX-Peer Methods

Schneider¹,

Lang²

2020

Preprint

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Peer methods are a comprehensive class of time integrators offering numerous degrees of freedom in their coefficient matrices that can be used to ensure advantageous properties, e.g. A-stability or super-convergence. In this paper, we show that implicitexplicit (IMEX) Peer methods are well-balanced and asymptotic preserving by construction without additional constraints on the coefficients. These properties are relevant when solving (the space discretisation of) hyperbolic systems of balance laws, for example. Numerical examples confirm the theoretical results and illustrate the potential of IMEX-Peer methods.

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“…In recent work, Schneider and colleagues [23,24] produced super-convergent IMEX Peer methods (a Peer method is a GLM where each stage is of the same order). These methods satisfy error inhibiting conditions similar to those in [5] and so produce order p + 1 although their truncation error is of order p, so we shall refer to them here as IMEX-EIS schemes.…”

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confidence: 99%

Explicit and implicit error inhibiting schemes with post-processing

Ditkowski

Grant

2020

Computers & Fluids

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High order implicit-explicit (IMEX) methods are often desired when evolving the solution of an ordinary differential equation that has a stiff part that is linear and a non-stiff part that is nonlinear. This situation often arises in semi-discretization of partial differential equations and many such IMEX schemes have been considered in the literature. The methods considered usually have a a global error that is of the same order as the local truncation error. More recently, methods with global errors that are one order higher than predicted by the local truncation error have been devised [18,28,5]. In prior work [6,7] we investigated the interplay between the local truncation error and the global error to construct explicit and implicit error inhibiting schemes that control the accumulation of the local truncation error over time, resulting in a global error that is one order higher than expected from the local truncation error, and which can be post-processed to obtain a solution which is two orders higher than expected. In this work we extend our error inhibiting with post-processing framework introduced in [6] and further in [7] to a class of additive general linear methods with multiple steps and stages. We provide sufficient conditions under which these methods with local truncation error of order p will produce solutions of order p + 1, which can be post-processed to order p + 2, and describe the construction of one such post-processor. We apply this approach to obtain implicit-explicit (IMEX) methods with multiple steps and stages. We present some of our new IMEX methods and show their linear stability properties, and investigate how these methods perform in practice on some numerical test cases.

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Super-convergent implicit–explicit Peer methods with variable step sizes

Cited by 9 publications

References 25 publications

Alternating directions implicit integration in a general linear method framework

Alternating directions implicit integration in a general linear method framework

Well-Balanced and Asymptotic Preserving IMEX-Peer Methods

Explicit and implicit error inhibiting schemes with post-processing

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