Modelling of a two-phase vortex-ring flow using an analytical solution for the carrier phase
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Publication:2423364
DOI10.1016/j.amc.2017.12.044zbMath1426.76709OpenAlexW2786826369MaRDI QIDQ2423364
Publication date: 21 June 2019
Published in: Applied Mathematics and Computation (Search for Journal in Brave)
Full work available at URL: https://research.brighton.ac.uk/en/publications/e122b60b-9918-4760-9ff1-6c302351ae6f
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- Structure of inertial-admixture accumulation zones in a tornado-like flow
- Investigation of regions of unbounded growth of the particle concentration in disperse flows
- Global time evolution of viscous vortex rings
- Dynamics of vortex rings and spray-induced vortex ring-like structures
- Self-similar clustering of inertial particles and zero-acceleration points in fully developed two-dimensional turbulence
- A model for the formation of “optimal” vortex rings taking into account viscosity
- A generalized vortex ring model
- Vortex Rings
- A universal time scale for vortex ring formation
- On the formation and propagation of vortex rings and pairs of vortex rings
- Dynamics of a Viscous Vortex Ring
- Two-way interaction between solid particles and homogeneous air turbulence: particle settling rate and turbulence modification measurements
- The unsteady Kármán problem for a dilute particle suspension
- Vortex Dynamics
- Turbulent clustering of stagnation points and inertial particles
- Global time evolution of an axisymmetric vortex ring at low Reynolds numbers
- Numerical simulation of the postformation evolution of a laminar vortex ring
- A model for confined vortex rings with elliptical-core vorticity distribution
- Full Lagrangian methods for calculating particle concentration fields in dilute gas-particle flows
- A fast Eulerian method for disperse two-phase flow
- Lagrangian modelling of dust admixture in gas flows
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