Lateral vibration of a water drop and its motion on a vibrating surface
暂无分享,去创建一个
M. Chaudhury | L. Dong | A. Chaudhury | L Dong | A Chaudhury | M K Chaudhury | Lichun Dong | Manoj K. Chaudhury
[1] F. Brochard-Wyart,et al. Vibrated sessile drops: Transition between pinned and mobile contact line oscillations , 2004, The European physical journal. E, Soft matter.
[2] J. Bikerman. Sliding of drops from surfaces of different roughnesses , 1950 .
[3] M. Chaudhury,et al. Ratcheting motion of liquid drops on gradient surfaces. , 2004, Langmuir : the ACS journal of surfaces and colloids.
[4] A. Ajdari,et al. Moving droplets on asymmetrically structured surfaces. , 1999, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.
[5] O. Basaran,et al. Nonlinear oscillations of pendant drops , 1994 .
[6] C. Sykes,et al. Average spreading parameter on heterogeneous surfaces , 1994 .
[7] A. Buguin,et al. Motions induced by asymmetric vibrations , 2006, The European physical journal. E, Soft matter.
[8] L. Rayleigh,et al. The theory of sound , 1894 .
[9] M. Perlin,et al. Boundary conditions in the vicinity of the contact line at a vertically oscillating upright plate: an experimental investigation , 1995, Journal of Fluid Mechanics.
[10] R. Smithwick,et al. Vibrations of microscopic mercury droplets on glass , 1989 .
[11] H. P. Greenspan,et al. On the motion of a small viscous droplet that wets a surface , 1978, Journal of Fluid Mechanics.
[12] S. Garoff,et al. Using Vibrational Noise To Probe Energy Barriers Producing Contact Angle Hysteresis , 1996 .
[13] K. Matsuda,et al. Self-Induced Vibration of a Water Drop Placed on an Oscillating Plate , 1996 .
[14] Tennyson Smith,et al. Effect of acoustic energy on contact angle measurements , 1978 .
[15] Ho-Young Kim,et al. The lowest oscillation mode of a pendant drop , 2006 .
[16] C. Furmidge,et al. Studies at phase interfaces. I. The sliding of liquid drops on solid surfaces and a theory for spray retention , 1962 .
[17] F. Brochard,et al. Motions of droplets on solid surfaces induced by chemical or thermal gradients , 1989 .
[18] O. Basaran,et al. Forced oscillations of pendant (sessile) drops , 1997 .
[19] Pascal Silberzan,et al. Ratchet-like topological structures for the control of microdrops , 2002 .
[20] S. Chandrasekhar. Hydrodynamic and Hydromagnetic Stability , 1961 .
[21] T. Lyubimova,et al. Non-axisymmetric oscillations of a hemispherical drop , 2004 .
[22] I. Saguy,et al. Contact angle measurement on rough surfaces. , 2004, Journal of colloid and interface science.
[23] M. Chaudhury,et al. Rectified Motion of Liquid Drops on Gradient Surfaces Induced by Vibration , 2002 .
[24] R. Kofman,et al. Vibration of submillimeter-size supported droplets. , 2006, Physical review. E, Statistical, nonlinear, and soft matter physics.
[25] M. Strani,et al. Free vibrations of a drop in partial contact with a solid support , 1984, Journal of Fluid Mechanics.
[26] M. Chaudhury,et al. Vibration-actuated drop motion on surfaces for batch microfluidic processes. , 2005, Langmuir : the ACS journal of surfaces and colloids.
[27] J. Brackbill,et al. A continuum method for modeling surface tension , 1992 .
[28] H. Rodot,et al. Zero-gravity simulation of liquids in contact with a solid surface , 1978 .
[29] K. Böhringer,et al. Directing droplets using microstructured surfaces. , 2006, Langmuir : the ACS journal of surfaces and colloids.