Do viscous flows slip?
Abstract
In this thesis, the Stokes equation is discussed and solved under different boundary
conditions. The Stokes equation governs the flow of viscous liquids, for example
honey or syrup. The first chapters in the thesis provides an introduction to multivector algebra and analysis, with the aim of presenting the concept of Hodge decompositions. With an application of this theory, the Stokes equation with the Hodge
boundary conditions is solved using the finite element method. This is compared to
the solution of the Stokes equation under the more standard no-slip condition. It
is concluded that the Hodge boundary conditions are natural from a mathematical
point of view, although they can not be used to model physical flows. In particular,
they are contrary to the known physical fact that viscous flows tend to stick to the
boundary. Moreover, it is showed that the Hodge boundary conditions can be interpreted in a way that the friction at the boundary of the domain is solely determined
by the curvature.
Degree
Student essay
Collections
Date
2023-12-21Author
Sjösvärd, Björn
Keywords
Mathematics, partial differential equations, multivectors, Hodge de-compositions, the Stokes equation, Hodge boun
Language
eng