This project involves fundamental studies of the role of nonlinearity in determining the motion of liquid masses under the principal influences of surface tension, viscosity and inertia. Issues to be explored are relevant to aspects of terrestrial processes, as well as being immediately applicable to fluid management in a low-gravity environment. Specific issues include (i) the mechanics of liquid masses in large-amplitude motions, (ii) the influence of bounding surfaces on the motion and (iii) the ability of such surfaces to control liquid motion by wetting forces, especially when they are augmented by various surface treatments. Mathematical techniques include asymptotic analysis of the governiing equations, for problem simplification, and numerical simulation, using both boundary-element and finite- difference methods. The flow problem is divided into an "outer" or inviscid potential-flow region and one or more inner, or viscous dominated, regions. Relevant to one inner region, the vicinity of the contact line, we discuss time-dependent simulation of slow droplet motion, on a surface of variable wettability, using the lubrication approximation. The simulation uses a disjoining pressure model and reproduces realistic wetting-dewetting behavior.
Schwartz, L.W., Free-Surface and Contact Line Motion of Liquids in Microgravity, Third Microgravity Fluids Physics Conference, NASA Lewis Research, Cleveland, OH, CP 3338, pp. 609-614, June 13, 1996.