Add to ORKGThis is a working paper in which a formulation is given for solving the boundary-layer equations in general body-fitted curvilinear coordinates while retaining the original Cartesian dependent variables. The solution procedure does not require that any of the coordinates be orthogonal, and much of the software developed for many Navier-Stokes schemes can be readily used. A limited number of calculations has been undertaken to validate the approach
The method described utilizes a nonorthogonal coordinate system for boundary-layer calculations. It ...
The Navier-Stokes equations of motion and the equation of continuity are transformed so as to apply ...
Generalization and improvement of an earlier work developed for studying separated flows using bound...
A set of higher-order boundary-layer equations is derived valid for three-dimensional compressible f...
A coordinate transformation, which can approximate many different two-dimensional and axisymmetric b...
Two generation methods were developed for three dimensional flows where the computational domain nor...
The boundary layer approximation to a given flow problem is not invariant if different coordinate sy...
A numerical method for solving the three-dimensional boundary layer equations for bodies of arbitrar...
A numerical solution to the Navier-Stokes equations was obtained for blunt axisymmetric entry bodies...
Two dimensional equations of steady motion for third order fluids are expressed in a special coordin...
A three-dimensional boundary-layer code was developed for particular application to realistic hypers...
The development of the governing equations for fluid flow in a surface following coordinate system i...
A method is described by means of which the laminar friction layer at a wall with arbitrary pressure...
A very general method for calculating compressible three-dimensional laminar and turbulent boundary ...
The application of stability theory in Laminar Flow Control (LFC) research requires that density and...
The method described utilizes a nonorthogonal coordinate system for boundary-layer calculations. It ...
The Navier-Stokes equations of motion and the equation of continuity are transformed so as to apply ...
Generalization and improvement of an earlier work developed for studying separated flows using bound...
A set of higher-order boundary-layer equations is derived valid for three-dimensional compressible f...
A coordinate transformation, which can approximate many different two-dimensional and axisymmetric b...
Two generation methods were developed for three dimensional flows where the computational domain nor...
The boundary layer approximation to a given flow problem is not invariant if different coordinate sy...
A numerical method for solving the three-dimensional boundary layer equations for bodies of arbitrar...
A numerical solution to the Navier-Stokes equations was obtained for blunt axisymmetric entry bodies...
Two dimensional equations of steady motion for third order fluids are expressed in a special coordin...
A three-dimensional boundary-layer code was developed for particular application to realistic hypers...
The development of the governing equations for fluid flow in a surface following coordinate system i...
A method is described by means of which the laminar friction layer at a wall with arbitrary pressure...
A very general method for calculating compressible three-dimensional laminar and turbulent boundary ...
The application of stability theory in Laminar Flow Control (LFC) research requires that density and...
The method described utilizes a nonorthogonal coordinate system for boundary-layer calculations. It ...
The Navier-Stokes equations of motion and the equation of continuity are transformed so as to apply ...
Generalization and improvement of an earlier work developed for studying separated flows using bound...