拟线性波动方程的局部可解性
Local Solvability of Quasilinear Wave Equation
摘要: 本文研究拟线性波动方程的柯西问题,在新的退化条件下证明解的唯一性和局部存在性。我们的证明基于特征方法、压缩映射原理和加权估计。
Abstract: We study the Cauchy problem of quasilinear wave equation and prove the uniqueness and local existence of the solution under the new degenerate condition. Our proof is based on the method of characteristic, contraction mapping principle and weighted estimates.
文章引用:盛烁民. 拟线性波动方程的局部可解性[J]. 理论数学, 2023, 13(7): 2200-2212. https://doi.org/10.12677/PM.2023.137226

参考文献

[1] Manfrin, R. (1999) Well Posedness in the Class for . Nonlinear Analysis: Theory, Methods & Ap-plications, 36, 177-212. [Google Scholar] [CrossRef
[2] Manfrin, R. (1995) A Solvability Result for a Nonlinear Weakly Hyperbolic Equation of Second Order. Nonlinear Differential Equations and Applications NoDEA, 2, 245-264. [Google Scholar] [CrossRef
[3] Manfrin, R. (1996) Local Solvability in for Quasi-Linear Weakly Hyperbolic Equations of Second Order. Communications in Partial Differential Equations, 21, 1487-1519. [Google Scholar] [CrossRef
[4] Ivrii, V. and Petkov, V. (1974) Necessary Con-ditions for the Cauchy Problem for Non-Strictly Hyperbolic Equations to Be Well Posed. Russian Mathematical Surveys, 29, 1-70. [Google Scholar] [CrossRef
[5] Sugiyama, Y. (2022) Local Solvability for a Quasilinear Wave Equation with the Far Field Degeneracy: 1D Case. Communications in Mathematical Sciences, 21, 219-237. [Google Scholar] [CrossRef
[6] Hu, Y. and Wang, G. (2018) On the Cauchy Problem for a Nonlinear Variational Wave Equation with Degenerate Initial Data. Nonlinear Analysis, 176, 192-208. [Google Scholar] [CrossRef
[7] Oleinik, O. (1970) On the Cauchy Problem for Weakly Hyperboic Equations. Communications on Pure and Applied Mathematics, 23, 569-586. [Google Scholar] [CrossRef
[8] Colombini, F. and Spagnolo, S. (1982) An Example of a Weakly Hyperbolic Cauchy Problem Not Well Posed in . Acta Mathematica, 148, 243-253. [Google Scholar] [CrossRef
[9] Taniguchi, K. and Tozaki, Y. (1980) A Hyperbolic Equation with Double Characteristics Which Has a Solution with Branching Singularities. Mathematica Japonica, 25, 279-300.
[10] Zhang, T. and Zheng, Y. (2016) The Structure of Solutions Near a Sonic Liner in Gas Gynamics via the Prssure Gradient Equation. Journal of Mathematical Analysis and Applications, 443, 39-56. [Google Scholar] [CrossRef
[11] Ruzhansky, M. and Yessirkegenov, N. (2020) Very Weak Solu-tions to Hypoelliptic Wave Equations. Journal of Differential Equations, 268, 2063-2088. [Google Scholar] [CrossRef
[12] Anikin, A.Y., Dobrokhotov, S.Y. and Nazaikinskii, V.E. (2018) Simple Asymptotics for a Generalized Wave Equation with Degenerating Velocity and Their Applications in the Linear Long Wave Run-Up Problem. Mathematical Notes, 104, 471-488. [Google Scholar] [CrossRef
[13] Speck, J. (2017) Finite-Time Degeneration of Hyperbolicity without Blowup for Quasilinear Wave Equations. Analysis & PDE, 10, 2001-2030. [Google Scholar] [CrossRef
[14] Hu, Y. (2018) On the Existence of Solutions to a One-Dimensional Degenerate Nonlinear Wave Equation. Journal of Differential Equations, 265, 157-176. [Google Scholar] [CrossRef
[15] Yamada, Y. (1987) Some Nonlinear Degenerate Wave Equations. Nonlinear Analysis: Theory, Methods & Applications, 11, 1155-1168. [Google Scholar] [CrossRef
[16] Sideris, T.C. (2013) Ordinary Differential Equation and Dynamical Systems. American Mathematical Society, Providence.
[17] Tao, T. (2006) Nolinear Dispersive Equationds: Local and Global Analysis. American Mathematical Society, Providence.
[18] Douglis, A. (1952) Some Existence Theorems for Hyperbolic Systems of Partial Differential Equation in Two Independent Variables. Communications on Pure and Applied Mathematics, 5, 119-154. [Google Scholar] [CrossRef

为你推荐