Graduation Semester and Year
2017
Language
English
Document Type
Dissertation
Degree Name
Doctor of Philosophy in Mathematics
Department
Mathematics
First Advisor
Chaoqun Liu
Abstract
Turbulence is still a world puzzle after over one hundred years research, and the current and classical theories brim with self-contradictions. C. Liu proposed a new theory on turbulence generation and structure after 28 years research, which are consistent without self-contradictions and well explain turbulence generation and structure. Based on this new theory, this dissertation (1) gives some mathematical explanations for new vortex identify method – Ω method; (2) analyzes the instability of shear layer by applying Chebyshev spectrum method to solve Orr-Sommerfeld eigenvalue equation; (3) investigates the vortex structure development in late flow transition; (4) utilizes the proper orthogonal decomposition to find the principal components of the flow in late stage of transition because of the flow complexity caused by hairpin vortex packet intertwining and interacting with each other. It is found that (1) Ω method can capture low-pressure region very well; (2) the high shear layer induced by the counter-rotation of two legs of Λ vortex ejection is unstable and the Λ vortex develops to a hairpin vortex packet with vortex rings generates; (3) streamwise vortices are principal in late stage of transition. It confirms the consistency of Liu’s theory: a pair of streamwise vortices ejects the low speed zone up and high shear layer generates; because of the instability of the high shear layer in boundary layer, the vortex ring forms and hairpin vortex generates.
Keywords
DNS, Vortex, Transition, Turbulence
Disciplines
Mathematics | Physical Sciences and Mathematics
License
This work is licensed under a Creative Commons Attribution-NonCommercial-Share Alike 4.0 International License.
Recommended Citation
Yang, Yong, "HIGH ORDER DNS FOR VORTEX STRUCTURE IN LATE FLOW TRANSITION" (2017). Mathematics Dissertations. 231.
https://mavmatrix.uta.edu/math_dissertations/231
Comments
Degree granted by The University of Texas at Arlington