Formation of coherent structures by fluid inertia in three-dimensional laminar flows
From MaRDI portal
Publication:3586967
DOI10.1017/S0022112010001552zbMath1193.76137OpenAlexW2170184529WikidataQ114873278 ScholiaQ114873278MaRDI QIDQ3586967
Z. Pouransari, M. F. M. Speetjens, Herman J. H. Clercx
Publication date: 1 September 2010
Published in: Journal of Fluid Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1017/s0022112010001552
Dynamical systems in fluid mechanics, oceanography and meteorology (37N10) Diffusion and convection (76R99)
Related Items (10)
Bifurcations and degenerate periodic points in a three dimensional chaotic fluid flow ⋮ Resonance phenomena in a time-dependent, three-dimensional model of an idealized eddy ⋮ Analysis of the spread of SARS-CoV-2 in a hospital isolation room using CFD and Lagrangian coherent structures ⋮ Global organization of three-dimensional, volume-preserving flows: Constraints, degenerate points, and Lagrangian structure ⋮ A Theoretical Framework for Lagrangian Descriptors ⋮ Lagrangian chaos in steady three-dimensional lid-driven cavity flow ⋮ The application of Lagrangian descriptors to 3D vector fields ⋮ Using Invariant Manifolds to Construct Symbolic Dynamics for Three-Dimensional Volume-Preserving Maps ⋮ Lagrangian Transport Through Surfaces in Volume-Preserving Flows ⋮ Explicit invariant manifolds and specialised trajectories in a class of unsteady flows
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- An adaptive method for computing invariant manifolds in non-autonomous, three-dimensional dynamical systems
- Existence of invariant tori in three-dimensional measure-preserving mappings
- On the integrability and perturbation of three-dimensional fluid flows with symmetry
- Transport in 3D volume-preserving flows
- Parabolic resonances in 3 degree of freedom near-integrable Hamiltonian systems
- Hamiltonian formulation of the equations of streamlines in three- dimensional steady flows
- Periodic points for two-dimensional Stokes flow in a rectangular cavity
- Linked twist map formalism in two and three dimensions applied to mixing in tumbled granular flows
- Merger of coherent structures in time-periodic viscous flows
- On passage through resonances in volume-preserving systems
- A spectral solver for the Navier–Stokes equations in the velocity–vorticity formulation
- The development of chaotic advection
- Chaotic advection in three-dimensional unsteady incompressible laminar flow
- Three-dimensional eddy structure in a cylindrical container
- Chaotic mixing in a bounded three-dimensional flow
- Mixing in the Stokes flow in a cylindrical container
- A numerical and experimental study on advection in three-dimensional Stokes flows
- Lagrangian measurement of vorticity dynamics in turbulent flow
- From Reynolds’s stretching and folding to mixing studies using horseshoe maps
- Introduction: mixing in microfluidics
- Foundations of chaotic mixing
- Engineering Flows in Small Devices: Microfluidics Toward a Lab-on-a-Chip
- Volume-preserving maps with an invariant
- Inertia-induced coherent structures in a time-periodic viscous mixing flow
- Topological mixing study of non-Newtonian duct flows
- Break-up of invariant surfaces in action-angle-angle maps and flows
This page was built for publication: Formation of coherent structures by fluid inertia in three-dimensional laminar flows
