Qualitative Behavior of Solutions to a Forced Nonlocal Thin-Film Equation

Abstract

We study a one-dimensional nonlocal degenerate fourth-order parabolic equation with inhomogeneous forces relevant to hydraulic fracture modeling. Employing a regularization scheme, modified energy/entropy methods, and novel differential inequality techniques, we establish global existence and long-time behavior results for weak solutions under both time-and space-dependent and time-and space-independent inhomogeneous forces. Specifically, for the time-and space-dependent force S(t, x), we prove that the solution converges to u0+1||∫0∞ ∫ S(r, x)\, dxdr , where u0=1||∫u0(x)\,dx is the spatial average of the initial data, and we provide bilateral estimates for the convergence rate. For the time-and space-independent force S0, we show that the solution approaches the linear function u0 + tS0 at an exponential rate.

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