Dissipative Intermittent Euler Flows Satisfying the Local Energy Inequality- [electronic resource]
Dissipative Intermittent Euler Flows Satisfying the Local Energy Inequality- [electronic resource]
- 자료유형
- 학위논문파일 국외
- 최종처리일시
- 20240214100429
- ISBN
- 9798379717551
- DDC
- 510
- 서명/저자
- Dissipative Intermittent Euler Flows Satisfying the Local Energy Inequality - [electronic resource]
- 발행사항
- [S.l.]: : Princeton University., 2023
- 발행사항
- Ann Arbor : : ProQuest Dissertations & Theses,, 2023
- 형태사항
- 1 online resource(472 p.)
- 주기사항
- Source: Dissertations Abstracts International, Volume: 84-12, Section: B.
- 주기사항
- Advisor: De Lellis, Camillo.
- 학위논문주기
- Thesis (Ph.D.)--Princeton University, 2023.
- 사용제한주기
- This item must not be sold to any third party vendors.
- 초록/해제
- 요약The goal of this thesis is to show the existence of dissipative solutions to the incompressible Euler equations with almost 1/3 of a derivative in L3 that satisfy the local energy inequality strictly. This proves an intermittent form of the Strong Onsager Conjecture proposed by Philip Isett. The contents of this thesis are joint work with Hyunju Kwon and Matthew Novack.
- 일반주제명
- Mathematics.
- 일반주제명
- Applied mathematics.
- 키워드
- Euler equations
- 기타저자
- Princeton University Mathematics
- 기본자료저록
- Dissertations Abstracts International. 84-12B.
- 기본자료저록
- Dissertation Abstract International
- 전자적 위치 및 접속
- 로그인 후 원문을 볼 수 있습니다.