PRECISE FINITE SPEED AND UNIQUENESS IN THE CAUCHY PROBLEM FOR SYMMETRIZABLE HYPERBOLIC SYSTEMS

被引：0

作者：

Rauch, Jeffrey ^{[1
]}

机构：

[1] Univ Michigan, Dept Math, Ann Arbor, MI 48109 USA

来源：

TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY | 2011年 / 363卷 / 03期

基金：

美国国家科学基金会;

关键词：

Finite speed; domain of influence; symmetrizable hyperbolic system; A uniqueness in the Cauchy problem; OPERATORS; STABILITY;

D O I：

10.1090/S0002-9947-2010-05047-0

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

Precise finite speed, in the sense of the domain of influence being a subset of the union of influence curves through the support of the initial data, is proved for hyperbolic systems symmetrized by pseudodifferential operators in the spatial variables. From this, uniqueness in the Cauchy problem at spacelike hypersurfaces is derived by a Holmgren style duality argument. Sharp finite speed is derived from an estimate for propagation in each direction. Propagation in a fixed direction is proved by regularizing the problem in the orthogonal directions. Uniform estimates for the regulaized equations are proved using pseudodifferential techniques of Beals-Fefferman type.

引用

页码：1161 / 1182

页数：22

共 50 条

[31] CAUCHY-PROBLEM FOR QUASILINEAR SYMMETRIC HYPERBOLIC SYSTEMS
KATO, T
ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS, 1975, 58 (03) : 181 - 205
[32] CAUCHY-PROBLEM FOR HYPERBOLIC SYSTEMS WITH DOUBLE CHARACTERISTICS
DEMAY, Y
COMPTES RENDUS HEBDOMADAIRES DES SEANCES DE L ACADEMIE DES SCIENCES SERIE A, 1974, 278 (11): : 771 - 773
[33] PARAMETRICS OF CAUCHIES PROBLEM OF NON-SYMMETRIZABLE HYPERBOLIC SYSTEMS WITH A CONSTANT DURATION OF CHARACTERISTICS
PETKOV, VM
DOKLADI NA BOLGARSKATA AKADEMIYA NA NAUKITE, 1976, 29 (08): : 1095 - 1097
[34] Uniqueness? failure for the finite element Cauchy-Poisson?s problem
Ben Belgacem, F.
Jelassi, F.
Girault, V.
COMPUTERS & MATHEMATICS WITH APPLICATIONS, 2023, 135 : 77 - 92
[35] ON THE UNIQUENESS OF THE CAUCHY-PROBLEM
DAMLAKHI, M
ZUILY, C
JOURNAL OF DIFFERENTIAL EQUATIONS, 1982, 45 (03) : 307 - 316
[36] Frequency truncation method for quasilinear symmetrizable hyperbolic systems
Manil T. Mohan
Sivaguru S. Sritharan
The Journal of Analysis, 2020, 28 : 117 - 140
[37] The Cauchy problem for faintly hyperbolic first order linear systems
Mencherini, L
BOLLETTINO DELLA UNIONE MATEMATICA ITALIANA, 2005, 8A (03): : 589 - 592
[38] CAUCHY-PROBLEM FOR HYPERBOLIC SYSTEMS WITH CHARACTERISTICS OF VARIABLE MULTIPLICITY
GOURDIN, D
COMPTES RENDUS DE L ACADEMIE DES SCIENCES SERIE I-MATHEMATIQUE, 1981, 292 (17): : 789 - 791
[39] A PROBLEM OF CAUCHY FOR NONLINEAR HYPERBOLIC SYSTEMS WITH INITIAL DATA DISTRIBUTIONS
GRAMCHEV, T
DOKLADI NA BOLGARSKATA AKADEMIYA NA NAUKITE, 1992, 45 (08): : 9 - 12
[40] Cauchy problem for quasilinear hyperbolic systems of shallow water equations
Fu, Xiaoyu
Sharma, V. D.
APPLICABLE ANALYSIS, 2013, 92 (11) : 2309 - 2319

← 1 2 3 4 5 →