Paper detail

On fast and slow times in models with diffusion

The linear Kelvin{Voigt operator L_εis a typical example of wave operator L_0 perturbed by higher-order viscous terms as \epsilonu_xxt. If Pεis a prefixed boundary value problem for L_ε, when ε= 0, L_εturns into L_0 and P_εinto a problem P_0 with the same initial{boundary conditions of Pε. Boundary layers are missing and the related control terms depending on the fast time are negligible. In a small time interval, the wave behavior is a realistic approximation of u_εwhen ε\rightarrow 0. On the contrary, when t is large, diffusion effects should prevail and the behavior of u_εfor ε\rightarrow 0 and t \rightarrow 1 should be analyzed. For this, a suitable functional correspondence between the Green functions G_εand G_0 of P_epsilon and P_0 is derived and its asymptotic behavior is rigorously examined. As a consequence, the interaction between diffusion effects and pure waves is evaluated by means of the slow time \epsilont; the main results show that in time intervals as (ε; 1/epsilon) pure waves are quasi-undamped, while damped oscillations predominate as from the instant t > 1/ε.