Computation of Stokes Flow in a Channel with a Collapsible Segment

We have studied steady flow in a 2-D channel with one plane rigid wall and with a segment of the other wall replaced by an elastic membrane. Numerical solutions of the full governing equations have been obtained for Reynolds number \(\operatorname{Re}=1-600\). The numerical method was to solve the N

In this article we introduce the separation of variables in the two-dimensional generalized Stokes problem, -ν∆u + αu + ∇p = f , for the flow in a channel. Also for the first time, we discuss the implementation of the Incremental Unknowns Method with a data structure of Compressed Column Storage. Tw

## Abstract Let T=ℝ×(‐1,1) and &ℴ⊂ℝ^2^ be a smoothly bounded open set, closure of which is contained in __T__. We consider the stationary Navier–Stokes flows in $\Omega {:=} T \backslash \bar{\scriptstyle{O}}$. In general, the pressure is determined up to a constant. Since Ω has two extremities, we