Klein-Gordon models with non-effective time-dependent potential
Abstract
In this thesis we study the asymptotic properties for the solution of the Cauchy
problem for the Klein-Gordon equation with non-effective time-dependent potential.
The main goal was define a suitable energy related to the Cauchy problem and derive
decay estimates for such energy. Strichartz’ estimates and results of scattering and
modified scattering was established. The C m theory and the stabilization condition
was applied to treat the case where the coefficient of the potential term has very fast
oscillations. Moreover, we consider a semi-linear wave model scale-invariant time-
dependent with mass and dissipation, in this step we used linear estimates related
with the semi-linear model to prove global existence (in time) of energy solutions for
small data and we show a blow-up result for a suitable choice of the coefficients.