Modeling of the unsteady force for shock-particle interaction
From MaRDI portal
Publication:1932279
DOI10.1007/s00193-009-0206-xzbMath1255.76062OpenAlexW2077900845MaRDI QIDQ1932279
Publication date: 17 January 2013
Published in: Shock Waves (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00193-009-0206-x
Related Items (6)
Equation of motion for a sphere in non-uniform compressible flows ⋮ A sharp interface Cartesian grid method for viscous simulation of shocked particle-laden flows ⋮ An Euler-Lagrange particle approach for modeling fragments accelerated by explosive detonation ⋮ Predictions of the transient loading on box-like objects by arbitrary pressure waves in air ⋮ Predictions of the transient loading exerted on circular cylinders by arbitrary pressure waves in air ⋮ Propagation of a strong shock over a random bed of spherical particles
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- On the added mass force at finite Reynolds and acceleration numbers
- Unsteady drag on a sphere by shock wave loading
- Shock waves in a dusty gas
- Diffraction of strong shocks by cones, cylinders, and spheres
- Equation of motion for a small rigid sphere in a nonuniform flow
- Flow past a sphere with an oscillation in the free-stream velocity and unsteady drag at finite Reynolds number
- Flow due to an oscillating sphere and an expression for unsteady drag on the sphere at finite Reynolds number
- Inertial and viscous forces on a rigid sphere in straining flows at moderate Reynolds numbers
- The Motion of High-Reynolds-Number Bubbles in Inhomogeneous Flows
- Forces on bodies moving unsteadily in rapidly compressed flows
- Unsteady flow about a sphere at low to moderate Reynolds number. Part 2. Accelerated motion
- Experimental measurements in a dusty-gas shock tube
- The generalized Kirchhoff equations and their application to the interaction between a rigid body and an arbitrary time-dependent viscous flow
- ON VIRTUAL MASS AND TRANSIENT MOTION IN SUBSONIC COMPRESSIBLE FLOW
- THE UNSTEADY, SUBSONIC MOTION OF A SPHERE IN A COMPRESSIBLE INVISCID FLUID
- A Theorem on a Special Class of Near-Vandermonde Determinants
This page was built for publication: Modeling of the unsteady force for shock-particle interaction
