Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by
Crossref.
Peng, Jie
and
Zhu, Ke-Qin
2011.
Instability of the interface in co-extrusion flow of two UCM fluids in the presence of surfactant.
Journal of Non-Newtonian Fluid Mechanics,
Vol. 166,
Issue. 1-2,
p.
152.
MacInnes, J.M.
Pitt, M.J.
Priestman, G.H.
and
Allen, R.W.K.
2012.
Analysis of two-phase contacting in a rotating spiral channel.
Chemical Engineering Science,
Vol. 69,
Issue. 1,
p.
304.
Sun, Xue-Wei
Peng, Jie
and
Zhu, Ke-Qin
2012.
The axisymmetric long-wave interfacial stability of core-annular flow of power-law fluid with surfactant.
Acta Mechanica Sinica,
Vol. 28,
Issue. 1,
p.
24.
Broadbent, Amber L.
Mullin, Jim M.
Codd, Sarah L.
Dockery, Jack D.
and
Seymour, Joseph D.
2012.
Pulsed Gradient Spin Echo Nuclear Magnetic Resonance Measurement and Simulation of Two-Fluid Taylor Vortex Flow in a Vertically Oriented Taylor–Couette Device.
Applied Magnetic Resonance,
Vol. 42,
Issue. 1,
p.
137.
Blyth, M. G.
and
Bassom, Andrew P.
2013.
Stability of surfactant-laden core–annular flow and rod–annular flow to non-axisymmetric modes.
Journal of Fluid Mechanics,
Vol. 716,
Issue. ,
Zhou, Zhi-Qiang
Peng, Jie
Zhang, Yang-Jun
and
Zhuge, Wei-Lin
2014.
Instabilities of viscoelastic liquid film coating tube in the presence of surfactant.
Journal of Non-Newtonian Fluid Mechanics,
Vol. 204,
Issue. ,
p.
94.
Picardo, Jason R.
Garg, P.
and
Pushpavanam, S.
2015.
Centrifugal instability of stratified two-phase flow in a curved channel.
Physics of Fluids,
Vol. 27,
Issue. 5,
Rickett, Lydia M.
Penfold, Robert
Blyth, Mark G.
Purvis, Richard
and
Cooker, Mark J.
2015.
Incipient mixing by Marangoni effects in slow viscous flow of two immiscible fluid layers.
IMA Journal of Applied Mathematics,
Vol. 80,
Issue. 5,
p.
1582.
Mukherjee, Soumyajit
and
Biswas, Rakesh
2015.
Ductile Shear Zones.
p.
59.
Mohammadi, Alireza
and
Smits, Alexander J.
2016.
Stability of Two-Immiscible-Fluid Systems: A Review of Canonical Plane Parallel Flows.
Journal of Fluids Engineering,
Vol. 138,
Issue. 10,
Peng, J.
Jiang, L. Y.
Zhuge, W. L.
and
Zhang, Y. J.
2016.
Falling film on a flexible wall in the presence of insoluble surfactant.
Journal of Engineering Mathematics,
Vol. 97,
Issue. 1,
p.
33.
TOYA, Yorinobu
OOI, Nobutaka
and
WATANABE, Takashi
2016.
Wave phenomena of an immiscible liquid-liquid interface circulating between rotating cylinders (Effects of the Reynolds number and the aspect ratio).
Transactions of the JSME (in Japanese),
Vol. 82,
Issue. 835,
p.
15-00621.
Ye, Han-yu
Yang, Li-jun
and
Fu, Qing-fei
2017.
Linear instability of compound liquid threads in the presence of surfactant.
Physical Review Fluids,
Vol. 2,
Issue. 8,
Tomar, Dharmendra S.
Baingne, Mahendra
and
Sharma, Gaurav
2017.
Stability of gravity-driven free surface flow of surfactant-laden liquid film flowing down a flexible inclined plane.
Chemical Engineering Science,
Vol. 165,
Issue. ,
p.
216.
Frenkel, Alexander L.
and
Halpern, David
2017.
Surfactant and gravity dependent instability of two-layer Couette flows and its nonlinear saturation.
Journal of Fluid Mechanics,
Vol. 826,
Issue. ,
p.
158.
Scase, M. M.
and
Hill, R. J. A.
2018.
Centrifugally forced Rayleigh–Taylor instability.
Journal of Fluid Mechanics,
Vol. 852,
Issue. ,
p.
543.
Yang, Hao
Jiang, Lu-Ye
Hu, Kai-Xin
and
Peng, Jie
2018.
Numerical study of the surfactant-covered falling film flowing down a flexible wall.
European Journal of Mechanics - B/Fluids,
Vol. 72,
Issue. ,
p.
422.
Forbes, L K
and
Bassom, Andrew P
2018.
Interfacial behaviour in two-fluid Taylor–Couette flow.
The Quarterly Journal of Mechanics and Applied Mathematics,
Vol. 71,
Issue. 1,
p.
79.
Kim, Youngjin
Choi, Hoyeon
Park, Yong Gap
Jang, Joonkyung
and
Ha, Man Yeong
2019.
Numerical study on the immiscible two-phase flow in a nano-channel using a molecular-continuum hybrid method.
Journal of Mechanical Science and Technology,
Vol. 33,
Issue. 9,
p.
4291.
Pernas Castaño, Tania
and
Velázquez, Juan J.L.
2020.
Analysis of a thin film approximation for two-fluid Taylor-Couette flows.
Journal of Differential Equations,
Vol. 269,
Issue. 1,
p.
377.