Decay characteristics for differential equations without linear terms

this work is dedicated to professor isaac horowitz, on his 75th birthday The zeros of the characteristic polynomial of many important equations in mathematical physics (e.g. the wave equation, the Schro dinger equation) are situated on the imaginary axis. This causes a very slow decay in the time v

The Landau damping problem for linear transport equations is studied in this work. Our results show that the behavior of α(v) plays an important role in the time decaying of the solutions.

We consider global strong solutions of the quasi-linear evolution equations (1.1) and (1.2) below, corresponding to sufficiently small initial data, and prove some stability estimates, as t → +∞, that generalize the corresponding estimates in the linear case.

We study certain classes of equations for F q -linear functions which are the natural function field counterparts of linear ordinary differential equations. It is shown that, in contrast to both classical and p-adic cases, formal power series solutions have positive radii of convergence near a singu