Some Initial Boundary Value Problems for a Nonlinear Pseudoparabolic System

## Abstract The existence and uniqueness of the global generalized solution and the global classical solution to the initial boundary value problem for a system of generalized IMBq equations are proved. This paper also arrives at some sufficient conditions of blow up of the solution in finite tim

It is observed that the one-dimensional heat equation with certain nonlinear boundary conditions can be reformulated as a system of coupled Volterra integral equations. A product trapezoidal scheme is proposed for the numerical solution of this integral equation system, and some numerical experiment

In this paper, we establish existence and multiplicity results for the problem Ž . Ž. w x Ž . Ž . xЉ q x q f t, x, xЈ s s t a.e. in 0, ; x 0 s x s ␥ , under the Ambrosetti᎐Prodi type condition, with f being a Caratheodory function.

## Communicated by J. Banasiak We propose a new quasi-linearization technique for solving systems of nonlinear equations. The method finds recursive formulae for higher order deformation equations which are then solved using the Chebyshev spectral collocation method. The implementation of the meth