A displacement-controlled analytical procedure for post-buckling analysis demonstrated by revisiting Euler buckling problem

TL;DR

This paper introduces a displacement-controlled analytical method for post-buckling analysis, demonstrated through Euler buckling, providing explicit solutions and insights into the energy landscape and bifurcation behavior.

Contribution

It develops a straightforward energy method based on displacement control, offering analytical solutions for post-buckling analysis that differ from traditional force-controlled approaches.

Findings

Analytical solutions for potential energy and deformation are obtained in closed-form.

Critical buckling states are identified as valley-ridge inflection points on the energy surface.

Post-buckling axial forces are nearly constant, indicating symmetric bifurcation.

Abstract

In view of the fundamental distinction between the force-controlled model and the displacement-controlled model in buckling problems of structures and the complexity of the asymptotic post-buckling analysis traditionally based on the force-controlled model, alternatively, we provide a straightforward theoretical procedure of the energy method for the buckling and post-buckling analysis completely based on the displacement-controlled model. The Euler buckling behavior is analytically tackled as a static displacement-controlled process as an example of the theoretical procedure, where no force potential energy component but compression and bending strain energy components are considered precisely at the deformed configuration for the total potential energy of the beams. Analytical solutions to the potential energy, structural deformation, internal forces and their critical results are obtained in closed-form for the beams with six typical boundary conditions. We find that these beams have only one unique but universal normalized potential energy surface depending on two dimensionless quantities. The valley bottom pathways on the potential energy surface show that the critical buckling state is not only a bifurcation point but also a valley-ridge inflection point, and the energy increases quadratically before the point and increases linearly with a slope of 2 beyond the point. The axial forces are gradually increasing during post-buckling, but are almost constant, indicating a symmetric neutral bifurcation buckling. Our theoretical expressions generally agree with the counterparts of the force-controlled model but exactly indicate somewhat differences. The present analytical procedure is basically useful to investigate any displacement-controlled buckling problems of beams, plates and shells.