On pressure boundary conditions for the incompressible Navier‐Stokes equations

Gresho, P. M.; Sani, R. L.

doi:10.1002/fld.1650071008

Cited by 528 publications

(378 citation statements)

References 37 publications

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“…(3), although care must be taken in imposing appropriate boundary conditions. 13,25,37 Because Eq. (4) is second order and the average pressure gradient (tri-linear terms) follows from the boundary conditions only.…”

Section: Intraventricular Pressure Gradientsmentioning

confidence: 99%

Left Ventricular Fluid Mechanics: The Long Way from Theoretical Models to Clinical Applications

Pedrizzetti

Domenichini

2014

Ann Biomed Eng

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Abstract-The flow inside the left ventricle is characterized by the formation of vortices that smoothly accompany blood from the mitral inlet to the aortic outlet. Computational fluid dynamics permitted to shed some light on the fundamental processes involved with vortex motion. More recently, patient-specific numerical simulations are becoming an increasingly feasible tool that can be integrated with the developing imaging technologies. The existing computational methods are reviewed in the perspective of their potential role as a novel aid for advanced clinical analysis. The current results obtained by simulation methods either alone or in combination with medical imaging are summarized. Open problems are highlighted and perspective clinical applications are discussed.

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Section: Intraventricular Pressure Gradientsmentioning

confidence: 99%

Left Ventricular Fluid Mechanics: The Long Way from Theoretical Models to Clinical Applications

Pedrizzetti

Domenichini

2014

Ann Biomed Eng

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“…Domain boundary conditions are the standard projection boundary conditions ( ∂φ ∂n = 0 at solid wall boundaries) [14]. Then the face-centered velocity field is corrected:…”

Section: Single-level Updatementioning

confidence: 99%

A cell-centered adaptive projection method for the incompressible Navier–Stokes equations in three dimensions

Martín

Colella

Graves

2008

Journal of Computational Physics

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We present a method for computing incompressible viscous flows in three dimensions using block-structured local refinement in both space and time. This method uses a projection formulation based on a cell-centered approximate projection, combined with the systematic use of multilevel elliptic solvers to compute increments in the solution generated at boundaries between refinement levels due to refinement in time. We use an L 0 -stable second-order semi-implicit scheme to evaluate the viscous terms. Results are presented to demonstrate the accuracy and effectiveness of this approach.

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“…This criticism is irrelevant to [1]. Furthermore, the claims in [2] were made on a rather informal basis in which case, just like a conjecture, one can later publish results that contradict a conjecture without having to be accused of being wrong.…”

Section: Our Paper Is Inconsistentmentioning

confidence: 99%