We investigate the transition from weakly nonlinear to nonlinear traveling-wave states. Pattern selection due to a transition from convective to absolute instability conditions is found, in good agreement with theory. While the linear properties depend on the (boundary-dependent) threshold of convection, the weakly nonlinear properties refer back to the threshold of an infinite system.
The Hebrew University websites utilize cookies to enhance user experience and analyze site usage. By continuing to browse these sites, you consent to our use of cookies.
