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초록
In this paper we study the Euler-Poincar, equations in . We prove local existence of weak solutions in , and local existence of unique classical solutions in , k > N/2 + 3, as well as a blow-up criterion. For the zero dispersion equation (alpha = 0) we prove a finite time blow-up of the classical solution. We also prove that as the dispersion parameter vanishes, the weak solution converges to a solution of the zero dispersion equation with sharp rate as alpha -> 0, provided that the limiting solution belongs to with k > N/2 + 3. For the stationary weak solutions of the Euler-Poincar, equations we prove a Liouville type theorem. Namely, for alpha > 0 any weak solution is u=0; for alpha= 0 any weak solution is u=0.
키워드
SHALLOW-WATER EQUATION; CAMASSA-HOLM EQUATION; GLOBAL WEAK SOLUTIONS; WELL-POSEDNESS; DYNAMICS; SHEETS; MOTION
- 제목
- Blow-up, Zero alpha Limit and the Liouville Type Theorem for the Euler-Poincar, Equations
- 저자
- Chae, Dongho; Liu, Jian-Guo
- 발행일
- 2012-09
- 유형
- Article
- 권
- 314
- 호
- 3
- 페이지
- 671 ~ 687