Scattering theory for semilinear wave equations with small data in two space dimensions
From MaRDI portal
Publication:1803580
DOI10.3792/pjaa.68.227zbMath0767.35055OpenAlexW2063707086MaRDI QIDQ1803580
Publication date: 29 June 1993
Published in: Proceedings of the Japan Academy. Series A (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3792/pjaa.68.227
Related Items (1)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Global existence theorem for semilinear wave equations with non-compact data in two space dimensions
- Global smooth solutions to a class of semilinear wave equations with strong nonlinearities
- Scattering theory in the energy space for a class of nonlinear wave equations
- The scattering theory for the nonlinear wave equation with small data
- Scattering for semilinear wave equations with small data in three space dimensions
- The scattering theory for the nonlinear wave equation with small data. II
- Finite-time blow-up for solutions of nonlinear wave equations
- Existence in the large for \(cmu=F(u)\) in two space dimensions
- Nonlinear scattering theory at low energy
- Long-time behavior of solutions to nonlinear evolution equations
- The lifespan of classical solutions to nonlinear wave equations in two space dimensions
- On small data scattering for 2-dimensional semilinear wave equations
- Blow-up of solutions of nonlinear wave equations in three space dimensions
- Existence of a global solution to a semi-linear wave equation with initial data of non-compact support in low space dimensions
- The equation utt − Δu = |u|p for the critical value of p
- Existence of a global solution to a semi–linear wave equation with slowly decreasing initial data in three space dimensions
- Long‐time behaviour of solutions of a system of nonlinear wave equations
- A Global Existence Theorem for Semilinear Wave Equations with Data of Non Compact Support in Two Space Dimensions
This page was built for publication: Scattering theory for semilinear wave equations with small data in two space dimensions
