Berlin 2008 – scientific programme

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DY: Fachverband Dynamik und Statistische Physik

DY 29: Poster II

DY 29.14: Poster

Thursday, February 28, 2008, 16:00–18:00, Poster C

Wetting on Geometrically Structured Surfaces — •Monica Marinescu^1,2, Mykola Tasinkevych^1,2, and Siegfried Dietrich^1,2 — ¹Max-Planck-Institut für Metallforschung, Heisenbergstr. 3, 70569 Stuttgart — ²Universität Stuttgart, Institut für Theoretische und Angewandte Physik, Pfaffenwaldring 57, 70569 Stuttgart

Complete wetting on different geometrically structured substrates of a fluid close to its liquid-gas coexistence is studied. The system is described by an effective interface Hamiltonian which takes into account the long-range character of the substrate potential. Four structured geometries consisting of periodic arrays of rectangular and cylindrical pits and posts are considered. As a limiting case, wetting on a substrate with two rectangular, perpendicular “grooves” is also studied.

We describe wetting behaviour by the interfacial height function l(Δ µ), where l is the height of the liquid/gas interface at the cavity midpoint and Δ µ the distance from bulk coexistence. Based on this function, we find a filling regime for all aforementioned geometries provided the system is driven close enough to bulk coexistence. In the postfilling regime, universal scaling behaviour and covariance of the interfacial height function are analyzed.