A multiple scales approach is used to approximate the effects of nonparallelism and streamwise curvature on the stability of three-dimensional disturbances in incompressible flow. The multiple scales approach is implemented with the full second-order system of equations. A detailed exposition of the source of all terms is provided
In this paper, we perform a systematic multiscale analysis for the three-dimensional incompressible ...
The linear stability of parallel shear flows of incompressible viscous fluids is classically describ...
AbstractSeveral reduced dimension two layer models of incompressible flow are developed. These are n...
The asymptotic formulations of the nonparallel linear stability of incompressible growing boundary l...
A compressible linear stability theory is presented for nonparallel three-dimensional boundary-layer...
Multiple scaling technique is used to examine the nonparallel instability of supersonic and hyperson...
Using a nonstandard version of the principle of virtual power, we develop a gradient theory for inco...
The stability of a laminar boundary layer has classically been analysed in terms of the solutions of...
The presence of a deformable free surface in thin films driven to spread by body or shear forces giv...
An analysis is presented for the linear stability of water boundary-layer flows over nonuniformly fl...
The theory of linear stability of shear flows has been studied extensively over much of the last cen...
The multifractal model of turbulence (MFM) and the three-dimensional Navier–Stokes equations are ble...
Three types of shallow flows are widespread in nature and engineering: wakes, mixing layers and jets...
The basic equations for the stability analysis of flow over three dimensional swept wings are develo...
Many problems in natural sciences and engineering involve phenomena that possess a wide spectrum of ...
In this paper, we perform a systematic multiscale analysis for the three-dimensional incompressible ...
The linear stability of parallel shear flows of incompressible viscous fluids is classically describ...
AbstractSeveral reduced dimension two layer models of incompressible flow are developed. These are n...
The asymptotic formulations of the nonparallel linear stability of incompressible growing boundary l...
A compressible linear stability theory is presented for nonparallel three-dimensional boundary-layer...
Multiple scaling technique is used to examine the nonparallel instability of supersonic and hyperson...
Using a nonstandard version of the principle of virtual power, we develop a gradient theory for inco...
The stability of a laminar boundary layer has classically been analysed in terms of the solutions of...
The presence of a deformable free surface in thin films driven to spread by body or shear forces giv...
An analysis is presented for the linear stability of water boundary-layer flows over nonuniformly fl...
The theory of linear stability of shear flows has been studied extensively over much of the last cen...
The multifractal model of turbulence (MFM) and the three-dimensional Navier–Stokes equations are ble...
Three types of shallow flows are widespread in nature and engineering: wakes, mixing layers and jets...
The basic equations for the stability analysis of flow over three dimensional swept wings are develo...
Many problems in natural sciences and engineering involve phenomena that possess a wide spectrum of ...
In this paper, we perform a systematic multiscale analysis for the three-dimensional incompressible ...
The linear stability of parallel shear flows of incompressible viscous fluids is classically describ...
AbstractSeveral reduced dimension two layer models of incompressible flow are developed. These are n...