Necking in coating flow over periodic substrates

Abstract: The free-boundary problem determining the shape of a layer of viscous fluid coating a substrate while draining steadily under gravity is solved analytically for substrates taking the form of a periodic array of long plates of arbitrary width and spacing. The mathematical problem involves solving Poisson's equation with constant forcing term in the fluid layer subject to vanishing Neumann and Dirichlet conditions on the free boundary. By considering the problem in a potential plane and using conformal mapping, … Show more

“…We mention here that, in the context of the vortical flow problem, in addition to the cases referred to above, results are known for a periodic, collinear array of infinitely many plates of finite length [15], and also for layers along walls driven by sources and sinks [13], including walls with gaps [17].…”

Solutions of a free boundary problem in a doubly connected domain via a circular-arc polygon

“…We mention here that, in the context of the vortical flow problem, in addition to the cases referred to above, results are known for a periodic, collinear array of infinitely many plates of finite length [15], and also for layers along walls driven by sources and sinks [13], including walls with gaps [17].…”

Solutions of a free boundary problem in a doubly connected domain via a circular-arc polygon

Exact and numerical solutions of a free boundary problem with a reciprocal growth law

Exact solutions for Hele-Shaw free boundary flows around a flat plate of finite length