We show that by certain transformations the boundary layer equations for the class of non-Newtonian fluids named pseudoplastic can be generalized in the form the vector differential operator(u) + p(x)u(exp -lambda) = 0, where x is a member of the set Omega and Omega is a subset of R(exp n), n is greater than or equal to 1 under the classical conditions for steady flow over a semi-infinite flat plate. We provide a survey of the existence, uniqueness, and analyticity of the solutions for this problem. We also establish numerical solutions in one- and two-dimensional regions using multigrid methods
AbstractWe consider a second-order nonlinear ordinary differential equation of the formy″=1qxyq,0⩽x<...
We will present qualitative and numerical results on a partial differential equation (PDE) system wh...
The stability of a laminar boundary layer has classically been analysed in terms of the solutions of...
AbstractWe consider the development of the nonstationary boundary layer about a body that gradually ...
It is shown that similarity solutions to a partial differential boundary valueproblem for power law ...
We consider the development of the nonstationary boundary layer about a body that gradually starts t...
AbstractIn the following we study a class of stationary Navier–Stokes equations with shear dependent...
Solutions of the steady laminar boundary equations for a moving continuous flat surface in a non-New...
A similarity analysis of the boundary layer flow caused by the motion of a semi-infinite flat sulfac...
A non-linear partial differential equation for the flow of all types of pseudoplastic fluids in poro...
The effect of finite suction velocity on the Blasius boundary-value problem, as generalized for powe...
Existence criteria are presented for nonlinear singular initial and boundary value problems. In part...
In this work, a variational multiscale (VMS) finite element formulation is used to approximate numer...
Petroleum Engineering Department,College of Engineering, King Saud University, P.O. Box 800, Riyadh ...
We describe different aspects of the theory of pseudo-differential equations on manifolds with non-s...
AbstractWe consider a second-order nonlinear ordinary differential equation of the formy″=1qxyq,0⩽x<...
We will present qualitative and numerical results on a partial differential equation (PDE) system wh...
The stability of a laminar boundary layer has classically been analysed in terms of the solutions of...
AbstractWe consider the development of the nonstationary boundary layer about a body that gradually ...
It is shown that similarity solutions to a partial differential boundary valueproblem for power law ...
We consider the development of the nonstationary boundary layer about a body that gradually starts t...
AbstractIn the following we study a class of stationary Navier–Stokes equations with shear dependent...
Solutions of the steady laminar boundary equations for a moving continuous flat surface in a non-New...
A similarity analysis of the boundary layer flow caused by the motion of a semi-infinite flat sulfac...
A non-linear partial differential equation for the flow of all types of pseudoplastic fluids in poro...
The effect of finite suction velocity on the Blasius boundary-value problem, as generalized for powe...
Existence criteria are presented for nonlinear singular initial and boundary value problems. In part...
In this work, a variational multiscale (VMS) finite element formulation is used to approximate numer...
Petroleum Engineering Department,College of Engineering, King Saud University, P.O. Box 800, Riyadh ...
We describe different aspects of the theory of pseudo-differential equations on manifolds with non-s...
AbstractWe consider a second-order nonlinear ordinary differential equation of the formy″=1qxyq,0⩽x<...
We will present qualitative and numerical results on a partial differential equation (PDE) system wh...
The stability of a laminar boundary layer has classically been analysed in terms of the solutions of...
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