Dynamical Systems Analysis of an Aerodynamic Decelerator's Behavior During the Initial Opening Process
Abstract
A new mathematical model is developed and analyzed to determine the qualitative behavior of an aerodynamic decelerator during the initial opening phase. Currently, all models of canopy opening are valid only once the canopy has begun to inflate and has some assumed shape. The ability to determine the appropriate initial shape would greatly enhance these models. A set of elastodynamic equations for a simplified canopy model is nonlinearly coupler to Lighthill's model for the relative velocity between a cylinder and the flow past it/ Previous work used a linear model for the fluid structure interaction. The new model presented in this paper removes this restriction by using a nonlinear interaction model. The resultant set of nonlinear partial differential equations is expended in terms of a complete set of eigenfunctions. The results is an infinite set of coupled ordinary differential equations in time. This set is then truncated to obtain various sets of low-dimensional models. These models are investigated to determine the stability of the canopy with respect to the fluid's velocity, the line tension and the drag coefficients. Using dynamical system theory, an understanding of the bifurcation process is obtained without having to solve the full system of nonlinear partial differential equations. Hence, it is possible to predict the onset of divergence and flutter as a function of the system parameters in an efficient manner.
Document Details
- Document Type
- Technical Report
- Publication Date
- Dec 01, 1991
- Accession Number
- ADA244194
Entities
People
- Louis J. Piscitelle
Organizations
- United States Army Soldier Systems Center