K
Kenji Inouye
Researcher at National Aerospace Laboratory
Publications - 5
Citations - 168
Kenji Inouye is an academic researcher from National Aerospace Laboratory. The author has contributed to research in topics: Boundary layer & Potential flow around a circular cylinder. The author has an hindex of 3, co-authored 5 publications receiving 146 citations.
Papers
More filters
Journal ArticleDOI
Finite-Difference Version of Quasi-Linearization Applied to Boundary-Layer Equations
Kenji Inouye,Atsushi Tate +1 more
Journal ArticleDOI
Transient Heat Transfer near a Stagnation-Point
Kenji Inouye,Takashi Yoshinaga +1 more
TL;DR: In this article, the transient heat transfer near a two dimensional stagnation point in a steady flow of a viscous and incompressible fluid is considered, where the temperature of the fluid is assumed to change abruptly from a constant to another constant.
Journal ArticleDOI
An Application of Approximate Integral Method to Stagnation Point Flow with Inviscid Magnetic Boundary Layer
TL;DR: In this article, a stable, two-dimensional stagnation point flow of a highly conducting, inviscid, incompressible fluid with an aligned magnetic field is considered and an approximate solution is obtained by the use of the Karman-Pohlhausen integral method.
Journal ArticleDOI
Some Investigations on Inviscid Boundary Layer of Magnetohydrodynamics
Abstract: The inviscid boundary layer in a two-dimensional aligned-fields flow of highly conducting, inviscid, incompressible fluid is considered If a transformation analogous to one in conventional viscous boundary layer problem is applied, a general solution of the magnetic boundary layer in the case of very weak magnetic filed is obtained A similar solution for the stagnation point flow is obtained by the method of series expansion in pressure number The solution for the same flow is also obtained by integrating directly the original equation without any expansion Both solution are compared with each other The discussions on the thickness of the boundary layer and nonexistence of the solution for the case of the case of the pressure number greater than unity are given