Lesson 3, part 3: linking stress to rate of strain
Understanding Stress Balance in Fluid Mechanics
Overview of Stress and Strain Tensors
- The lecture introduces the stress tensor and rate of strain tensor, emphasizing their symmetry properties.
- It discusses contributions to overall stress in a fluid, including static stresses like hydrostatic pressure and dynamic stresses related to strain rates.
Rules for Assembling a Stress Balance
- Three essential rules for forming a stress balance are outlined:
- Rule 1: Dimensional consistency is crucial; all terms must have compatible units.
- Rule 2: Rank consistency is necessary; tensors of different ranks cannot be added together.
- Rule 3: Symmetry must be maintained; any addition to the stress tensor should also be symmetric.
Contributions to Total Stress
- The total stress (Sigma) combines contributions from hydrostatic pressure (P) and shear stress tensor (tau).
- Pressure is treated as a scalar that needs manipulation to fit into the tensor framework, requiring it to be expressed correctly for summation with other tensors.
Manipulating Pressure for Tensor Consistency
- To integrate pressure into the total stress equation, it is represented as negative P multiplied by an identity tensor, ensuring proper rank and dimensionality.
- The identity tensor conveys that pressure acts equally in all normal directions without contributing shear stresses.
Final Formulation of Total Stress
- The final expression for total stress includes both hydrostatic pressure and shear components while adhering to all three rules established earlier.
- This formulation leads into force and momentum balances, ultimately connecting back to the Navier-Stokes equations.
Key Takeaways on Stress Summation Rules
- Recap of the three critical rules:
- All terms must be dimensionally consistent.
- Terms must maintain rank consistency when summed.