期刊
JOURNAL OF FLUID MECHANICS
卷 929, 期 -, 页码 -出版社
CAMBRIDGE UNIV PRESS
DOI: 10.1017/jfm.2021.813
关键词
bifurcation; vortex dynamics; turbulence simulation
资金
- National Science Foundation [CBET-2042834]
- Alexander von Humboldt Foundation through the Humboldt Research Award
This paper investigates the flow dynamics in a periodic porous medium and analyzes the origin and mechanism of the symmetry-breaking phenomenon. Flow instabilities are formed when surface forces on solid obstacles compete with the inertial force of the fluid flow, causing deviations in flow direction from the pressure gradient direction, especially in the range of porosity from 0.43 to 0.72 for circular solid obstacles. The phenomenon is a result of unresolved flow physics that can exhibit multiple modes depending on local vortex shedding processes and is sensitive to porosity, solid obstacle shape, and Reynolds number, influencing macroscale turbulence anisotropy in porous media.
The focus of this paper is a numerical simulation study of the flow dynamics in a periodic porous medium to analyse the physics of a symmetry-breaking phenomenon, which causes a deviation in the direction of the macroscale flow from that of the applied pressure gradient. The phenomenon is prominent in the range of porosity from 0.43 to 0.72 for circular solid obstacles. It is the result of the flow instabilities formed when the surface forces on the solid obstacles compete with the inertial force of the fluid flow in the turbulent regime. We report the origin and mechanism of the symmetry-breaking phenomenon in periodic porous media. Large-eddy simulation (LES) is used to simulate turbulent flow in a homogeneous porous medium consisting of a periodic, square lattice arrangement of cylindrical solid obstacles. Direct numerical simulation is used to simulate the transient stages during symmetry breakdown and also to validate the LES method. Quantitative and qualitative observations are made from the following approaches: (1) macroscale momentum budget and (2) two- and three-dimensional flow visualization. The phenomenon draws its roots from the amplification of a flow instability that emerges from the vortex shedding process. The symmetry-breaking phenomenon is a pitchfork bifurcation that can exhibit multiple modes depending on the local vortex shedding process. The phenomenon is observed to be sensitive to the porosity, solid obstacle shape and Reynolds number. It is a source of macroscale turbulence anisotropy in porous media for symmetric solid-obstacle geometries. In the macroscale, the principal axis of the Reynolds stress tensor is not aligned with any of the geometric axes of symmetry, nor with the direction of flow. Thus, symmetry breaking in porous media involves unresolved flow physics that should be taken into consideration while modelling flow inhomogeneity in the macroscale.
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