An introductory graduate course in fluid mechanics. Topics include: continuum hypothesis; perfect gas and departures from perfect gas; vectors and tensors; conservation laws for a continuum: mass momentum and energy; constitutive theory for fluids; viscosity and molecular transport; compressible Navier-Stokes equations; kinematics of the flow field: vorticity, streamlines; incompressible Navier-Stokes equations and their applications: Poiseuille flow, low Reynolds number flows, flows at large Reynolds number, boundary layers, external flows: flow stability and introduction to the theory of turbulence.
| Spring | Summer | Fall | ||
|---|---|---|---|---|
| (Session 1) | (Session 2) | |||
| 2023 | ||||
| 2022 | ||||
| 2021 | ||||
| 2020 | ||||
| 2019 | ||||
| 2018 | ||||
| 2017 | ||||
| 2016 | ||||
| 2015 | ||||
| 2014 | ||||
| 2013 | ||||
| 2012 | ||||
| 2011 | ||||
| 2010 | ||||
| 2009 | ||||
| 2008 | ||||
| 2007 | ||||
| 2006 | ||||
| 2005 | ||||
| 2004 | ||||
| 2003 | ||||
| 2002 | ||||
| 2001 | ||||
| 2000 | ||||
| 1999 | ||||
| 1998 | ||||