Qualitative properties of large buckled states of spherical shells
Abstract
A system of 6th-order quasi-linear Ordinary Differential Equations is analyzed to show the global existence of axisymmetrically buckled states. A surprising nodal property is obtained which shows that everywhere along a branch of solutions that bifurcates from a simple eigenvalue of the linearized equation, the number of simultaneously vanishing points of both shear resultant and circumferential bending moment resultant remains invariant, provided that a certain auxiliary condition is satisfied.
- Publication:
-
National Aeronautics and Space Administration Report
- Pub Date:
- September 1985
- Bibcode:
- 1985nasa.reptW....S
- Keywords:
-
- Branching (Mathematics);
- Buckling;
- Differential Equations;
- Eigenvalues;
- Nonlinearity;
- Spherical Shells;
- Symmetry;
- Bending Moments;
- Circumferences;
- Invariance;
- Shear Properties;
- Engineering (General)