论文信息 - A waiting time phenomenon for thin film equations

A waiting time phenomenon for thin film equations

We prove the occurrence of a waiting time phenomenon for solutions to fourth order degenerate parabolic differential equations which model the evolution of thin films of viscous fluids. In space dimension less or equal to three, we identify a general criterion on the growth of initial data near the free boundary which guarantees that for sufficiently small times the support of strong solutions locally does not increase. It turns out that this condition only depends on the smoothness of the diffusion coefficient in its point of degeneracy. Our approach combines a new version of Stampacchia’s iteration lemma with weighted energy or entropy estimates. On account of numerical experiments, we conjecture that the aforementioned growth criterion is optimal.

Lorenzo Giacomelli | Günther Grün | Roberta Dal Passo

[1] Francisco Bernis,et al. Finite speed of propagation and continuity of the interface for thin viscous flows , 1996, Advances in Differential Equations.

[2] M. Bertsch,et al. Nonnegative solutions of a fourth-order nonlinear degenerate parabolic equation , 1995 .

[3] S. H. Davis,et al. On the motion of a fluid-fluid interface along a solid surface , 1974, Journal of Fluid Mechanics.

[4] L. Nirenberg,et al. On elliptic partial differential equations , 1959 .

[5] Mary C. Pugh,et al. The lubrication approximation for thin viscous films: Regularity and long-time behavior of weak solutions , 1996 .

[6] Francisco Bernis,et al. Source type solutions of a fourth order nonlinear degenerate parabolic equation , 1992 .

[7] Nicholas D. Alikakos,et al. On the pointwise behavior of the solutions of the porous medium equation as t approaches zero or infinity , 1985 .