Global existence and decay for solutions of the Hele-Shaw flow with injection
classification
🧮 math.AP
keywords
injectiondecayfluidhele-shawrateexistenceglobalsphere
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We study the global existence and decay to spherical equilibrium of Hele-Shaw flows with surface tension. We prove that without injection of fluid, perturbations of the sphere decay to zero exponentially fast. On the other hand, with a time-dependent rate of fluid injection into the Hele-Shaw cell, the distance from the moving boundary to an expanding sphere (with time-dependent radius) also decays to zero but with an algebraic rate, which depends on the injection rate of the fluid.
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