JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, v. 288, issue. 2, page. 505-517
Abstract
This paper investigates the time-dependent Stokes flow of a viscous fluid in a channel with nonzero net entry flow. Assuming the fluid to be initially at rest with entry flow at the finite end of a semi-infinite channel, energy bounds for the flow are derived. It is shown that the flow decays exponentially in energy norm to a transient Poiseuille flow as the distance from the finite end tends to infinity. The problem was previously investigated by Lin (SAACM 2 (1992) 249-264) for the case in which the net entry flow was zero. Our methods are patterned after those of Lin, but a somewhat better choice of arbitrary constants yields an improved decay rate for Lins problem. (C) 2003 Elsevier Inc. All rights reserved.