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Contact lines on stretched soft solids: modelling anisotropic surface stresses

Stefanie Heyden, Nicolas Bain, Qin Xu, Robert W. Style, Eric R. Dufresne

2021Proceedings of the Royal Society A Mathematical Physical and Engineering Sciences16 citationsDOIOpen Access PDF

Abstract

We present fully analytical solutions for the deformation of a stretched soft substrate due to the static wetting of a large liquid droplet, and compare our solutions to recently published experiments (Xu et al. 2018 Soft Matter 14, 916–920 (doi:10.1039/C7SM02431B)). Following a Green’s function approach, we extend the surface-stress regularized Flamant–Cerruti problem to account for uniaxial pre-strains of the substrate. Surface profiles, including the heights and opening angles of wetting ridges, are provided for linearized and finite kinematics. We fit experimental wetting ridge shapes as a function of applied strain using two free parameters, the surface Lamé coefficients. In comparison with experiments, we find that observed opening angles are more accurately captured using finite kinematics, especially with increasing levels of applied pre-strain. These fits qualitatively agree with the results of Xu et al ., but revise values of the surface elastic constants.

Topics & Concepts

WettingAnisotropySurface (topology)Materials scienceRidgeDeformation (meteorology)MechanicsFunction (biology)Free surfaceContact angleGeometryWetting transitionOrientation (vector space)Substrate (aquarium)Finite thicknessFinite strain theoryFinite element methodComposite materialMathematical analysisSurface stressBendingSurface Modification and SuperhydrophobicityAdhesion, Friction, and Surface InteractionsNanomaterials and Printing Technologies
Contact lines on stretched soft solids: modelling anisotropic surface stresses | Litcius