The existence of global weak solutions is proved for one-dimensional
lubrication models that describe the dewetting process of nanoscopic thin
polymer films on hydrophobyzed substrates and take account of large slippage at
the polymer-substrate interface. The convergence of these solutions as either
the Reynolds number or the capillarity goes to zero, as well as their limiting
behaviour as the slip length goes to zero or infinity are investigated

Kitavtsev, Georgy

Laurencot, Philippe

Niethammer, Barbara

Methods and Applications of Analysis

English

arXiv

The existence of global weak solutions is proved for one-dimensional lubrication models that describe the dewetting process of nanoscopic thin polymer films on hydrophobyzed substrates and take account of large slippage at the polymer-substrate interface. The convergence of these solutions as either the Reynolds number or the capillarity goes to zero, as well as their limiting behaviour as the slip length goes to zero or infinity are investigated

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Weak solutions to lubrication equations in the presence of strong slippage

International audienceThe existence of global weak solutions is proved for one-dimensional lubrication models that describe the dewetting process of nanoscopic thin polymer films on hydrophobyzed substrates and take account of large slippage at the polymer-substrate interface. The convergence of these solutions as either the Reynolds number or the capillarity goes to zero, as well as their limiting behaviour as the slip length goes to zero or infinity are investigated

Weak solutions to lubrication equations in the presence of strong slippage

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Scientific Publications of the University of Toulouse II Le Mirail