On the Choice of Interface Parameters in Robin–Robin Loosely Coupled Schemes for Fluid–Structure Interaction

Gigante, Giacomo; Vergara, Christian

doi:10.3390/fluids6060213

Cited by 5 publications

(5 citation statements)

References 47 publications

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“…The interaction law would nowadays be called an interface or transmission condition, but we like to stick to its original name as given more than four decades ago. It would be interesting to compare the outcome of the recent optimizations of the coefficients of Robin-Robin conditions [38] with the well-established physical models used as interaction law.…”

Section: The Quasi-simultaneous Coupling Methodsmentioning

confidence: 99%

Quasi-simultaneous coupling methods for partitioned problems in computational hemodynamics

Rozema

Veldman²,

Maurits³

2023

Applied Numerical Mathematics

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Section: The Quasi-simultaneous Coupling Methodsmentioning

confidence: 99%

Quasi-simultaneous coupling methods for partitioned problems in computational hemodynamics

Rozema

Veldman²,

Maurits³

2023

Applied Numerical Mathematics

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“…This typically yields stability issues: in particular, loosely coupled partitioned schemes (based on explicit time discretization of the whole FSI problem) may generate blowing-up solutions due to an incorrect energy balance [27]. Although in recent years stable loosely coupled partitioned schemes for hemodynamics were studied [18,24,25,40,49,50,52], here we focus on the two most traditional families of schemes that guarantee stability in hemodynamics:…”

Section: Fluid-structure Coupling Schemesmentioning

confidence: 99%

“…The FSI numerical coupling schemes that have been proposed in the literature (see, e.g., [20,29,56,59,70]) can be roughly classified into partitioned loosely coupled (or explicit) schemes [18,24,25,40,49,50,52], partitioned fully coupled (or fixed-point, or implicit) schemes [14,15,27,69,70,76,78] and monolithic (or Newton-based) schemes [45,55,64,81,93,114,115]. The schemes differ significantly in their modularity and in the implementation effort that they require, and in terms of their performance [68,70].…”

Section: Introductionmentioning

confidence: 99%

Partitioned and Monolithic Algorithms for the Numerical Solution of Cardiac Fluid-Structure Interaction

Bucelli¹,

Dedè²,

null³

et al. 2022

CiCP

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We review and compare different fluid-structure interaction (FSI) numerical methods in the context of heart modeling, aiming at assessing their computational efficiency for cardiac numerical simulations and selecting the most appropriate method for heart FSI. Blood dynamics within the human heart is characterized by active muscular action, during both contraction and relaxation phases of the heartbeat. The efficient solution of the FSI problem in this context is challenging, due to the added-mass effect (caused by the comparable densities of fluid and solid, typical of biomechanics) and to the complexity, nonlinearity and anisotropy of cardiac consitutive laws. In this work, we review existing numerical coupling schemes for FSI in the two classes of strongly-coupled partitioned and monolithic schemes. The schemes are compared on numerical tests that mimic the flow regime characterizing the heartbeat in a human ventricle, during both systole and diastole. Active mechanics is treated in both the active stress and active strain frameworks. Computational costs suggest the use of a monolithic method. We employ it to simulate a full heartbeat of a human ventricle, showing how it allows to efficiently obtain physiologically meaningful results.

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“…Good choices of α RN balance out these two opposing trends, but are very difficult to determine a priori. Various highly recommendable works study the effect of the Robin parameter in detail, like Badia et al [19], Gerardo-Giorda et al [21], Cao et al [22,23], or Gigante and Vergara [24]. Analyzing simplified FSI problems, for example potential or inviscid flows interacting with linear beam or membrane models, they derive suggestions for choosing α RN , including both constant values and spatially varying expressions [23].…”

Section: Robin-neumann Schemementioning

confidence: 99%

“…Unfortunately, however, the Robin-Neumann scheme also introduces new drawbacks. In particular, its performance is strongly governed by the Robin parameter that controls the weighting of Dirichlet and Neumann contributions; and although tuning this parameter has been studied for various simplified FSI problems [21][22][23][24], efficient choices are in general problem-dependent and difficult to find a priori.…”

Section: Introductionmentioning

confidence: 99%

A Robin-Neumann Scheme with Quasi-Newton Acceleration for Partitioned Fluid-Structure Interaction

Spenke¹,

Make²,

Hosters³

2022

Preprint

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The Dirichlet-Neumann scheme is the most common partitioned algorithm for fluid-structure interaction (FSI) and offers high flexibility concerning the solvers employed for the two subproblems. Nevertheless, it is not without shortcomings: To begin with, the inherent added-mass effect often destabilizes the numerical solution severely. Moreover, the Dirichlet-Neumann scheme cannot be applied to FSI problems in which an incompressible fluid is fully enclosed by Dirichlet boundaries, as it is incapable of satisfying the volume constraint.In the last decade, interface quasi-Newton methods have proven to control the added-mass effect and substantially speed up convergence by adding a Newton-like update step to the Dirichlet-Neumann coupling. They are, however, without effect on the incompressibility dilemma. As an alternative, the Robin-Neumann scheme generalizes the fluid's boundary condition to a Robin condition by including the Cauchy stresses. While this modification in fact successfully tackles both drawbacks of the Dirichlet-Neumann approach, the price to be paid is a strong dependency on the Robin weighting parameter, with very limited a priori knowledge about good choices.This work proposes a strategy to merge these two ideas and benefit from their combined strengths. The effectiveness of this new quasi-Newton-accelerated Robin-Neumann scheme is demonstrated for different FSI simulations and compared to both Robin-and Dirichlet-Neumann variants.

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On the Choice of Interface Parameters in Robin–Robin Loosely Coupled Schemes for Fluid–Structure Interaction

Cited by 5 publications

References 47 publications

Quasi-simultaneous coupling methods for partitioned problems in computational hemodynamics

Quasi-simultaneous coupling methods for partitioned problems in computational hemodynamics

Partitioned and Monolithic Algorithms for the Numerical Solution of Cardiac Fluid-Structure Interaction

A Robin-Neumann Scheme with Quasi-Newton Acceleration for Partitioned Fluid-Structure Interaction

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