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Well-Posedness and qualitative behaviour of the Mullins-Sekerka problem with ninety-degree angle boundary contact
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Well-Posedness and qualitative behaviour of the Mullins-Sekerka problem with ninety-degree angle boundary contact
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We show local well-posedness for the Mullins-Sekerka system with ninety degree angle boundary contact. We will describe the motion of the moving interface by a height function over a fixed reference surface. Using the theory of maximal regularity together with a linearization of the equations and a localization argument we will prove well-posedness of the full nonlinear problem via the contraction mapping principle. Here one difficulty lies in choosing the right space for the Neumann trace of the height function and showing maximal $L_p-L_q$-regularity for the linear problem. In the second part we show that solutions starting close to certain equilibria exist globally in time, are stable, and converge to an equilibrium solution at an exponential rate.
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Cited by 1 Pith paper
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Stability analysis for stationary solutions of the Mullins-Sekerka flow with boundary contact
Linearized stability analysis of flat and circular-arc stationary solutions for the Mullins-Sekerka flow with 90° contact angle, showing parameter-dependent stability from exponential stability to instability.
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