Application of the UNIQUAC equation to regular solutions

## Abstract We consider the Cauchy problem for second‐order strictly hyperbolic equations with time‐depending non‐regular coefficients. There is a possibility that singular coefficients make a regularity loss for the solution. The main purpose of this paper is to derive an optimal singularity for t

The Shabat equation where + and q are parameters, is the simplest self-similar reduction of the so-called dressing chain for constructing and analyzing exactly solvable Schro dinger equations. It is so relevant to the study of the q-oscillator algebra in quantum mechanics. The main objective of thi

It is shown how by combining the ideas of the direct perturbation theory approach to the solution of the Dirac equation and the regular expansion as used in the Chang-PClissier-Durand Hamiltonian one can derive a spin-free approximation to the Dirac equation that resembles a similar equation recent

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.

## Abstract First the existence of global regular two‐dimensional solutions to Navier–Stokes equations in a bounded cylinder and for boundary slip conditions is proved. Next stability of sum of two dimensional and axially symmetric solutions is proved. Copyright © 2006 John Wiley & Sons, Ltd.