Soichiro Katayama, Daisuke Murotani, Hideaki Sunagawa
Published 2011-11-17Version 1
We consider semilinear wave equations with small initial data in two space dimensions. For a class of wave equations with cubic nonlinearity, we show the global existence of small amplitude solutions, and give an asymptotic description of the solution as $t \to \infty$ uniformly in $x \in {\mathbb R}^2$. In particular, our result implies the decay of the energy when the nonlinearity is dissipative.
Energy decay for systems of semilinear wave equations with dissipative structure in two space dimensions
Asymptotic pointwise behavior for systems of semilinear wave equations in three space dimensions
The lifespan of solutions of semilinear wave equations with the scale-invariant damping in two space dimensions
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