کد مقاله | کد نشریه | سال انتشار | مقاله انگلیسی | نسخه تمام متن |
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612792 | 880707 | 2006 | 13 صفحه PDF | دانلود رایگان |
Here, we derive analytical asymptotic expressions for the dynamic surface tension of ionic surfactant solutions in the general case of nonstationary interfacial expansion. Because the diffusion layer is much wider than the electric double layer, the equations contain a small parameter. The resulting perturbation problem is singular and it is solved by means of the method of matched asymptotic expansions. The derived general expression for the dynamic surface tension is simplified for the special case of immobile interface and for the maximum bubble pressure method (MBPM). The case of stationary interfacial expansion is also considered. The effective diffusivity of the ionic surfactant essentially depends on the concentrations of surfactant and nonamphiphilic salt. To test the theory, the derived equations are applied to calculate the surfactant adsorption from MBPM experimental data. The results excellently agree with the adsorption determined independently from equilibrium surface-tension isotherms. The derived theoretical expressions could find application for interpreting data obtained by MBPM and other experimental methods for investigating interfacial dynamics.
To derive analytical expressions for the dynamic surface tension of ionic surfactant solutions, we accounted for the existence of two regions near the interface: a relatively narrow electric double layer and a much wider outer diffusion layer.Figure optionsDownload high-quality image (49 K)Download as PowerPoint slide
Journal: Journal of Colloid and Interface Science - Volume 303, Issue 1, 1 November 2006, Pages 56–68