Weak Singularity of Navier-Stokes Equations Based on Energy Estimation in Sobolev Space
Abstract
Based on Dou Huashu's energy gradient theory, this paper focuses on the weak singularity of the incompressible Navier-Stokes (NS) equations in steady, fully developed flows. When the gradient of total mechanical energy is perpendicular to the streamline (i.e., uj ∂ E∂ xj = 0 ), substituting this critical condition into the NS equations with no-slip boundary conditions leads to the viscous term 0 . To rigorously analyze the regularity of the solution, Sobolev space H01() is introduced for energy estimation. The results show that the velocity field loses H1 -regularity, and the NS equations degenerate into Euler equations, which admit discontinuous weak solutions. Thus, the position where the mechanical energy gradient is perpendicular to the streamline becomes a weak singularity of the NS equations.
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