On the Holomorphic Solution of Non–Linear Totally Characteristic Equations

## Communicated by V. Lvov Approximate solutions of the non-linear Boltzmann equation, which have the structure of the linear combination of three global Maxwellians with arbitrary hydrodynamical parameters, are considered. Some sufficient conditions which allow the error between the left-and the

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.

## Communicated by A. Piskorek This work proves global in time existence of large solutions for a quasistatic problem in non-linear viscoelasticity in the three-dimensional case. The basic idea is to apply the energy method for local in time solutions.

We study the global existence, asymptotic behaviour, and global non-existence (blow-up) of solutions for the damped non-linear wave equation of Kirchho! type in the whole space: , and '0, with initial data u(x, 0)"u (x) and u R (x, 0)"u (x).

We study on the initial-boundary value problem for some degenerate non-linear wave equations of Kirchhoff type with a strong dissipation: When the initial energy associated with the equations is non-negative and small, a unique (weak) solution exists globally in time and has some decay properties.