On Systems of Semilinear Wave Equations with Unequal Propagation Speeds in Three Space Dimensions
スポンサーリンク
概要
- 論文の詳細を見る
In this paper we study coupled systems of semilinear wave equations and derive sharp conditions for the small data global existence and blowup for the system. The way of the interaction in the nonlinearities plays an important role to determine the condition. We focus on the case where propagation speeds also come into play. The discrepancy of the speeds is actually essential in Theorem 3.1 for instance. Moreover, in some cases we have different conclusion for the same nonlinearity according to the order of them. To handle such cases, we modify the argument presented by F. John [12].
- 日本数学会函数方程式論分科会の論文
日本数学会函数方程式論分科会 | 論文
- The Landau-Lifshitz Flow of Maps into the Lobachevsky Plane
- Uniqueness of Solutions for Zakharov Systems
- Characterization of Wave Front Sets in Fourier-Lebesgue Spaces and Its Application
- Affine Weyl Group Symmetry of the Garnier System
- Exact Eigenvalues and Eigenfunctions Associated with Linearization for Chafee-Infante Problem