Analysis of steady viscous flow in slender tubes

A tube of circular cross section whose radius is a function of a slow variable Z = (1/R)z, where z is the co-ordinate in the axial direction and R is a large streamwise Reynolds number, may be designated a slender tube. An elementary approximation to the flow in such,tubes is obtained and results co

Cardiovascular illness is most commonly caused by a constriction, called a stenosis. A non-linear mathematical model with a free moving boundary was introduced to study viscous flow in tapered elastic tubes with axisymmetric constrictions subject to a prescribed pressure drop and a uniform external

## Abstract This paper presents a new neural network‐boundary integral approach for analysis of steady viscous fluid flows. Indirect radial basis function networks (IRBFNs) which perform better than element‐based methods for function interpolation, are introduced into the BEM scheme to represent th

The problem of laminar Newtonian converging flow in a conical tube is investigated. The inlet velocity profile is assumed to be parabolic. The equation of motion is simplified by assuming that the cone angle is small and that the streamlines are only slightly curved. A finite difference solution is