We consider the thin-film equation $partial_t h + partial_y left(m(h) partial_y^3 hright) = 0$ in ${h > 0}$ with partial-wetting boundary conditions and inhomogeneous mobility of the form $m(h) = h^3+lambda^{3-n}h^n$, where $h ge 0$ is the film height, $lambda > 0$ is the slip length, $y > 0$ denotes the lateral variable, and $n in (0,3)$ is the mobility exponent parameterizing the nonlinear slip condition. The partial-wetting regime implies the boundary condition $partial_y h = mathrm{const.} > 0$ at the triple junction $partial{h > 0}$ (nonzero microscopic contact angle). Existence and uniqueness of traveling-wave solutions to this problem under the constraint $partial_y^2 h to 0$ as $h to infty$ have been proved in previous work by Chiricotto and Giacomelli in [Commun. Appl. Ind. Math., 2(2):e-388, 16, 2011]. We are interested in the asymptotics as $h downarrow 0$ and $h to infty$. By reformulating the problem as $h downarrow 0$ as a dynamical system for the error between the solution and the microscopic contact angle, values for $n$ are found for which linear as well as nonlinear resonances occur. These resonances lead to a different asymptotic behavior of the solution as $hdownarrow0$ depending on $n$. Together with the asymptotics as $htoinfty$ characterizing Tanners law for the velocity-dependent macroscopic contact angle as found by Giacomelli, the first author of this work, and Otto in [Nonlinearity, 29(9):2497-2536, 2016], the rigorous asymptotics of the traveling-wave solution to the thin-film equation in partial wetting can be characterized. Furthermore, our approach enables us to analyze the relation between the microscopic and macroscopic contact angle. It is found that Tanners law for the macroscopic contact angle depends continuously differentiably on the microscopic contact angle.
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