0
TECHNICAL PAPERS

Oscillatory Free Surface Displacement of Finite Amplitude in a Small Orifice

[+] Author and Article Information
Brian J. Daniels, James A. Liburdy

Department of Mechanical Engineering, Oregon State University, Corvallis, OR 97331

J. Fluids Eng 126(5), 818-826 (Dec 07, 2004) (9 pages) doi:10.1115/1.1789525 History: Received February 08, 2003; Revised March 23, 2004; Online December 07, 2004
Copyright © 2004 by ASME
Your Session has timed out. Please sign back in to continue.

References

Burr, R. F., Tence, D. A., and Berger, S. S., 1996, “Multiple Dot Size Fluidics for Phase Change Piezoelectric Ink Jets,” Proc. IS&T’s International Conference on Digital Printing Technologies, Vol. 12, pp. 12–18.
Burr, R. F., Berger, S. S., and Tence, D. A., 1996, “Overview of Phase Change Piezoelectric Ink Jet Fluids Modeling and Design,” Proc. ASME Fluids Division Sumer Meeting, Vol. 4, pp. 94–99.
Berger, S. S., Burr, R. F., Padgett, J. D., and Tence, D. A., 1997, “Ink Manifold Design of Phase Change Piezoelectric Ink Jets,” Proc. IS&T’s International Conference on Digital Printing Technologies, Vol. 13, pp. 703–708.
Benjamin,  T. B., and Ursell,  F., 1954, “The Stability of the Plane Free Surface of a Liquid in Vertical Periodic Motion,” Proc. R. Soc. London, Ser. A, 225, pp. 505–515.
Penny,  W. G., and Price,  T. R., 1952, “Part II Finite Periodic Stationary Gravity Waves in a Perfect Liquid,” Philos. Trans. R. Soc. London, Ser. A, 244, pp. 254–284.
Taylor,  G. I., 1953, “An Experimental Study of Standing Waves,” Proc. R. Soc. London, Ser. A, 218, pp. 44–59.
Tadjbakhsh,  I., and Keller,  J. B., 1960, “Standing Surface Waves of Finite Amplitude,” J. Fluid Mech., 8, pp. 442–451.
Fultz,  D., 1962, “An Experimental Note on Finite-Amplitude Standing Gravity Waves,” J. Fluid Mech., 13, pp. 193–212.
Edge,  R. D., and Walters,  G., 1964, “The Period of Standing Gravity Waves of Largest Amplitude on Water,” J. Geophys. Res., 69, pp. 1674–1675.
Mack,  L. R., 1962, “Periodic, Finite-Amplitude, Axisymmetric Gravity Waves,” J. Geophys. Res., 67, pp. 829–843.
Fultz,  D., and Murty,  T. S., 1963, “Experiments on the Frequency of Finite-Amplitude Axisymmetric Gravity Waves in a Circular Cylinder,” J. Geophys. Res., 68, pp. 1457–1462.
Dodge,  F. T., Kana,  D. D., and Abramson,  H. N., 1965, “Liquid Surface Oscillations in Longitudinally Excited Rigid Cylindrical Containers,” AIAA J., 3, pp. 685–695.
Vanden-Broek,  J.-M., and Tuck,  E. O., 1994, “Flow Near the Intersection of a Free Surface With a Vertical Wall,” SIAM (Soc. Ind. Appl. Math.) J. Appl. Math., 54, pp. 1–13.
Marsh,  J. A., Garoff, and  S., Dussan,  V., 1993, “Dynamic Contact Angles and Hydrodynamics Near a Moving Contact Line,” Phys. Rev. Lett., 70, pp. 2778–2781.
Dussan,  V. E.B., and Davis,  S. H., 1986, “Stability in Systems With Moving Contact Lines,” J. Fluid Mech., 173, pp. 115–130.
Schlicting, H., and Gersten, K., 2000, Boundary-Layer Theory, 8th ed., Springer-Verlag, Berlin.
Probstein, R. F., 1989, Physicochemical Hydrodynamics an Introduction, Butterworth, Stoneham MA, pp. 289–300.
Lamb, H., 1932, Hydrodynamics, 6th ed., Dover, New York.

Figures

Grahic Jump Location
Schematic of the test device
Grahic Jump Location
Schematic of the experiment setup
Grahic Jump Location
Measured and predicted surface profiles using the potential theory and viscous modified theory of the central peak for modes 2 through 5 for (a) the 794-μm and (b) the 1180-μm diameter orifices
Grahic Jump Location
Comparison of predicted (white) and measured (gray) annular peak locations for mode numbers 3 through 6 using the viscous modified solutions for (a) the 794-μm- and (b) the 1180-μm-diameter orifices
Grahic Jump Location
Predicted secondary peak locations versus frequency for potential theory and viscous modified potential theory, as well as measured data for (a) the 794-μm- and (b) the 1180-μm-diameter orifices
Grahic Jump Location
Potential theory modal frequency predictions versus γn/R and viscous modified potential theory frequency predictions versus γn/R; as well as measured modal frequencies versus γn/R and γn/R for both the 794- and 1180-μm orifices

Tables

Errata

Discussions

Some tools below are only available to our subscribers or users with an online account.

Related Content

Customize your page view by dragging and repositioning the boxes below.

Related Journal Articles
Related eBook Content
Topic Collections

Sorry! You do not have access to this content. For assistance or to subscribe, please contact us:

  • TELEPHONE: 1-800-843-2763 (Toll-free in the USA)
  • EMAIL: asmedigitalcollection@asme.org
Sign In