On the stability of nonlinear waves in integrable models

1 consider the nonlinear stability of plane wave solutions to a Ginzburg-Landau equation with additional fifth-order terms and cubic terms containing spatial derivatives. 1 show that, under the constraint that the diffusion coefficient be real, these waves are stable. Furthermore, it is shown that t

We study the asymptotic behavior of solutions to a combustion model which contains the effect of convection, viscosity, chemical reaction, and diffusion. It is proved that if a perturbation of a travelling strong detonation wave is small, then the solution to this system converges to a strong detona

## Abstract The objective of the research conducted by the authors is to explore the feasibility of determining reliable __in situ__ values of shear modulus as a function of strain. In this paper the meaning of the material stiffness obtained from impact and harmonic excitation tests on a surface s