Uniqueness of Rapidly Decaying Solutions to the Haraux–Weissler Equation

Long-time behavior and regularity are studied for solutions of the Stark equation It is shown that for a class of short-range potentials V(x) the gain of local smoothness and the decay as |t| Ä are close to those of the corresponding Schro dinger equation u t =i(&2+V(x)) u.

We investigate the ¸N}¸O estimate of solutions to the Cauchy problem of linear viscoelastic equation, especially, the di!usion wave property of linear viscoelastic equation like the Navier}Stokes equation in the compressible #uid case, which was studied by D. Ho! and K. Zumbrum and Tai-P.

## Abstract In this paper we derive a decay rate of the __L__^2^‐norm of the solution to the 3‐D Navier–Stokes equations. Although the result which is proved by Fourier splitting method is well known, our method is new, concise and direct. Moreover, it turns out that the new method established here

In this paper we prove theorems on propagation of smallness and the uniqueness of solutions to some elliptic equations in the plane. We start with analogues of these theorems for harmonic functions and use their quasiinvariance under quasiconformal mappings as well as the connection of considered eq