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pro vyhledávání: '"Nguyen, Trinh"'
We study the boundary layer theory for slightly viscous stationary flows forced by an imposed slip velocity at the boundary. According to the theory of Prandtl (1904) and Batchelor (1956), any Euler solution arising in this limit and consisting of a
Externí odkaz:
http://arxiv.org/abs/2308.15447
Autor:
Kim, Chanwoo, Nguyen, Trinh T.
A rigorous derivation of point vortex systems from kinetic equations has been a challenging open problem, due to singular layers in the inviscid limit, giving a large velocity gradient in the Boltzmann equations. In this paper, we derive the Helmholt
Externí odkaz:
http://arxiv.org/abs/2303.12257
Autor:
Lal, Sumeet1 (AUTHOR) lsumeet@hiroshima-u.ac.jp, Nguyen, Trinh Xuan Thi1 (AUTHOR), Bawalle, Aliyu Ali1 (AUTHOR), Khan, Mostafa Saidur Rahim1 (AUTHOR), Kadoya, Yoshihiko1 (AUTHOR)
Publikováno v:
Behavioral Sciences (2076-328X). Sep2024, Vol. 14 Issue 9, p795. 19p.
Publikováno v:
In Chemical Engineering Journal 15 October 2024 498
Publikováno v:
In Energy 1 October 2024 305
Autor:
Le, Diep Dinh, Nguyen, Trinh Hao, Nguyen, Luc Tan, Le Nguyen, Dao Anh, Thi Le, Mai Ngoc, Nguyen, Khoa Dang, Phan, Ha Bich, Tran, Phuong Hoang
Publikováno v:
In Heliyon 30 September 2024 10(18)
Autor:
Huynh, Bao, Tung, N.T., Nguyen, Trinh D.D., Bui, Quang-Thinh, Nguyen, Loan T.T., Yun, Unil, Vo, Bay
Publikováno v:
In Knowledge-Based Systems 5 September 2024 299
Autor:
Dieu Nguyen, Linh, Hoang Nguyen, Nhi, Hoang Ngoc Do, Mai, Thai Nguyen, The, Hao Nguyen, Trinh, Thien Gia Hua, Chi, Hoang Tran, Phuong
Publikováno v:
In Microchemical Journal September 2024 204
Autor:
Nguyen, Toan T., Nguyen, Trinh T.
In their classical work [20], Caflisch and Sammartino established the inviscid limit and boundary layer expansions of vanishing viscosity solutions to the incompressible Navier-Stokes equations for analytic data on a half-space. It was then subsequen
Externí odkaz:
http://arxiv.org/abs/2201.07195
We prove the inviscid limit for the incompressible Navier-Stokes equations for data that are analytic only near the boundary in a general two-dimensional bounded domain. Our proof is direct, using the vorticity formulation with a nonlocal boundary co
Externí odkaz:
http://arxiv.org/abs/2111.14782