Calculation of unsteady flows in turbomachinery using the linearized Euler equations
Abstract
A method for calculating unsteady flows in cascades is presented. The model, which is based on the linearized unsteady Euler equations, accounts for blade loading shock motion, wake motion, and blade geometry. The mean flow through the cascade is determined by solving the full nonlinear Euler equations. Assuming the unsteadiness in the flow is small, then the Euler equations are linearized about the mean flow to obtain a set of linear variable coefficient equations which describe the small amplitude, harmonic motion of the flow. These equations are discretized on a computational grid via a finite volume operator and solved directly subject to an appropriate set of linearized boundary conditions. The steady flow, which is calculated prior to the unsteady flow, is found via a Newton iteration procedure. An important feature of the analysis is the use of shock fitting to model steady and unsteady shocks. Use of the Euler equations with the unsteady Rankine-Hugoniot shock jump conditions correctly models the generation of steady and unsteady entropy and vorticity at shocks. In particular, the low frequency shock displacement is correctly predicted. Results of this method are presented for a variety of test cases. Predicted unsteady transonic flows in channels are compared to full nonlinear Euler solutions obtained using time-accurate, time-marching methods. The agreement between the two methods is excellent for small to moderate levels of flow unsteadiness. The method is also used to predict unsteady flows in cascades due to blade motion (flutter problem) and incoming disturbances (gust response problem).
- Publication:
-
AIAA Journal
- Pub Date:
- June 1989
- DOI:
- 10.2514/3.10178
- Bibcode:
- 1989AIAAJ..27..777H
- Keywords:
-
- Cascade Flow;
- Computational Fluid Dynamics;
- Euler Equations Of Motion;
- Linearization;
- Shock Waves;
- Turbine Blades;
- Turbomachinery;
- Unsteady Flow;
- Aeroelasticity;
- Channel Flow;
- Computation;
- Computational Grids;
- Finite Volume Method;
- Flutter;
- Newton Methods;
- Nonlinear Equations;
- Operators (Mathematics);
- Time Marching;
- Transonic Flow;
- Fluid Mechanics and Heat Transfer