Add to ORKGWe have developed a code where the nonlinear terms are treated implicitly. The equations are discretized using the two-point fourth order compact scheme in the y-direction and the backward Euler method in the x-direction. We investigated the transition process in a Blasius boundary layer due to fundamental type breakdown. With 8 modes in the w and 3 planes, we could compute the evolution of disturbances up to Re(x)=910, which is well into the strongly nonlinear region. The transition onset point is located around Re(x)=850. The comparison with the measurements and with the DNS computations are very good up to Re(x)=880
The linear stability theory was applied to the problem of boundary layer transition in incompressibl...
We use direct numerical simulations in the presence of free-stream turbulence having different value...
A rational foundation is provided for the application of the linear stability theory of parallel she...
The transition to turbulence in boundary layers was investigated by direct numerical solution of the...
Parabolized stability equations (PSE) are used in a variational approach to study the optimal, non-m...
The linear and nonlinear evolution of steady and traveling disturbances in three-dimensional incompr...
Compressible stability of growing boundary layers is studied by numerically solving the partial diff...
The primary stability of incompressible three-dimensional boundary layers is investigated using the ...
Turbulence is allegedly “the most important unsolved problem of classical physics” (attributed to R...
The transition of an incompressible boundary layer, with zero pressure gradient and low free-stream ...
Asymptotic methods are used to describe the nonlinear self-interaction between pairs of oblique inst...
A glimpse is provided of the research program in stability, transition, and turbulence based on nume...
AbstractThe process of evolution, especially that of nonlinear evolution, of C-type instability of l...
This paper describes a scenario of transition from laminar to turbulent flow in a spatially developi...
Maintaining laminar flow and delaying transition to turbulence on aircraft wings reduces friction dr...
The linear stability theory was applied to the problem of boundary layer transition in incompressibl...
We use direct numerical simulations in the presence of free-stream turbulence having different value...
A rational foundation is provided for the application of the linear stability theory of parallel she...
The transition to turbulence in boundary layers was investigated by direct numerical solution of the...
Parabolized stability equations (PSE) are used in a variational approach to study the optimal, non-m...
The linear and nonlinear evolution of steady and traveling disturbances in three-dimensional incompr...
Compressible stability of growing boundary layers is studied by numerically solving the partial diff...
The primary stability of incompressible three-dimensional boundary layers is investigated using the ...
Turbulence is allegedly “the most important unsolved problem of classical physics” (attributed to R...
The transition of an incompressible boundary layer, with zero pressure gradient and low free-stream ...
Asymptotic methods are used to describe the nonlinear self-interaction between pairs of oblique inst...
A glimpse is provided of the research program in stability, transition, and turbulence based on nume...
AbstractThe process of evolution, especially that of nonlinear evolution, of C-type instability of l...
This paper describes a scenario of transition from laminar to turbulent flow in a spatially developi...
Maintaining laminar flow and delaying transition to turbulence on aircraft wings reduces friction dr...
The linear stability theory was applied to the problem of boundary layer transition in incompressibl...
We use direct numerical simulations in the presence of free-stream turbulence having different value...
A rational foundation is provided for the application of the linear stability theory of parallel she...