Local existence for semilinear weakly hyperbolic equations with time dependent coefficients

## Abstract In this paper we study local and global well‐posedness in __L__^2^ and __H__^1^ of the Cauchy problem for the following nonlinear Schrödinger equations equation image in the space ℝ^1+__n__^ , with __n__ ≥ 2. The coefficient __a__ (__t__) is assumed to be positive, and possibly vanish

The paper deals with the time-dependent linear heat equation with a non-linear and non-local boundary condition that arises when considering the radiation balance. Solutions are considered to be functions with values in < : "+v3H( )" v3¸(R ),. As a consequence one has to work with non-standard Sobo

A~traet--Galerkin fully discrete approximations for hyperbolic equations with time-dependent coefficients are analyzed. The schemes are based on implicit Runge-Kutta-Nystr6m methods, and are coupled with preconditioned iterative methods for the efficient, albeit approximate, solution of the resultin