A method of immersed layers on Cartesian grids, with application to incompressible flows

•Extends the discrete Dirac delta function with an associated discrete masking function on the grid.•Creates a set of discrete identities on masked field data on the grid.•Develops the concept of an immersed layer, connecting grid differencing with jumps in fields across an immersed surface.•Derives...

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Bibliographic Details
Published in:Journal of computational physics 2022-01, Vol.448, p.110716, Article 110716
Main Author: Eldredge, Jeff D.
Format: Article
Language:English
Subjects:
Cartesian coordinates
Cartesian grid
Computational fluid dynamics
Computational physics
Delta function
Flow simulation
Fluid flow
Identities
Immersed boundary method
Incompressible flow
Interfaces
Mathematical analysis
Operators (mathematics)
Partial differential equations
Rotating cylinders
Surface geometry
Two dimensional flow
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Summary:•Extends the discrete Dirac delta function with an associated discrete masking function on the grid.•Creates a set of discrete identities on masked field data on the grid.•Develops the concept of an immersed layer, connecting grid differencing with jumps in fields across an immersed surface.•Derives semi-discrete partial differential equations on masked fields with immersed layer terms.•Demonstrates use of immersed layers in solution of prototype PDEs. The immersed boundary method (IBM) of Peskin (J. Comput. Phys., 1977), and derived forms such as the projection method of Taira and Colonius (J. Comput. Phys., 2007), have been useful for simulating flow physics in problems with moving interfaces on stationary grids. However, in their interface treatment, these methods do not distinguish one side from the other, but rather, apply the motion constraint to both sides, and the associated interface force is an inseparable mix of contributions from each side. In this work, we define a discrete Heaviside function, a natural companion to the familiar discrete Dirac delta function (DDF), to define a masked version of each field on the grid which, to within the error of the DDF, takes the intended value of the field on the respective sides of the interface. From this foundation we develop discrete operators and identities that are uniformly applicable to any surface geometry. We use these to develop extended forms of prototypical partial differential equations, including Poisson, convection-diffusion, and incompressible Navier-Stokes, that govern the discrete masked fields. These equations contain the familiar forcing term of the IBM, but also additional terms that regularize the jumps in field quantities onto the grid and enable us to individually specify the constraints on field behavior on each side of the interface. Drawing the connection between these terms and the layer potentials in elliptic problems, we refer to them generically as immersed layers. We demonstrate the application of the method to several representative problems, including two-dimensional incompressible flows inside a rotating cylinder and external to a rotating square.
ISSN:0021-9991
1090-2716
DOI:10.1016/j.jcp.2021.110716