NON LINEAR BUCKLING OF COLUMNS
Abstract
Abstract:The geometric non-linear total potential energy equation is developed andextended to study the behavior of buckling and deflection beyond the bifurcationpoint and showing columns resistance beyond the Euler load.Three types of boundary conditions are studied (pin ended, fixed ended andcantilever). The equation of non-linear total potential energy is solved by exactmethod (closed form solution) and compared with other approximated methods(Rayleigh- Ritz, Koiter’s theory and non-linear finite difference method). Theagreement is found quite enough and satisfactory for most situations of practicalcases.Key words:Bifurcation, Buckling, Columns, Finite difference method, Koiter’s theory,nonlinear buckling and Rayleigh- Ritz method
Keywords
Key words: Bifurcation, Buckling, Columns, Finite difference method, Koiter’s theory, nonlinear buckling and Rayleigh- Ritz method.Metrics