Explores the dynamics of steady Euler flows on Riemannian manifolds, covering ideal fluids, Euler equations, Eulerisable flows, and obstructions to exhibiting plugs.
Introduces the fundamentals of fluid mechanics, covering mass and momentum conservation, external forces, viscous stresses, and the conversion of surface integrals to volume integrals.
Delves into deriving the Kalman-Hauad-Morning relation in stationary turbulence, emphasizing homogeneity and isotropy assumptions, and culminates in the common Howard-Mohnen relation.
