Global existence and causality for a transmission problem with a repulsive nonlinearity

F. Ali Mehmeti, V. Regnier

Published 2006-02-01Version 1

It is well-known that the solution of the classical linear wave equation with compactly supported initial condition and vanishing initial velocity is also compactly supported in a set depending on time : the support of the solution at time t is causally related to that of the initially given condition. Reed and Simon have shown that for a real-valued Klein-Gordon equation with (nonlinear) right-hand side $- \lambda u^3$, causality still holds. We show the same property for a one-dimensional Klein-Gordon problem but with transmission and with a more general repulsive nonlinear right-hand side $F$. We also prove the global existence of a solution using the repulsiveness of $F$. In the particular case $F(u) = - \lambda u^3$, the problem is a physical model for a quantum particle submitted to self-interaction and to a potential step.