CONICET | Buscador de Institutos y Recursos Humanos

A direct procedure for the evaluation of imperfection-sensitivity in bifurcation problems is presented. The problems arise in the context of the general theory of elastic stability (Koiters theory) for discrete structural systems, in which the total potential energy is employed together with a stability criterion based on energy derivatives. The imperfection sensitivity of critical states, such as bifurcations and trifurcations, is usually represented as a plot of the critical load versus the amplitude of the imperfection considered. However, such plots have a singularity at the point, so that a regular perturbation expansion of the solution is not possible. In this work, we describe a direct procedure to obtain the sensitivity of the critical load (eigenvalue of the bifurcation problem) and the sensitivity of the critical direction (eigenvector of the bifurcation problem) using singular perturbation analysis. The perturbation expansions are constructed as a power series in terms of the imperfection amplitude, in which the exponents and the coefficients are the unknowns of the problem. The solution of the exponents is obtained by means of trial and error using a least degenerate criterion, or by geometrical considerations. To compute the coefficients a detailed formulation is presented, which employs the conditions of equilibrium and stability at the critical state and their contracted forms. The formulation is applied to symmetric bifurcations, and the coefficients are solved up to third-order terms in the expansion. The algorithm is illustrated by means of a simple example (a beam on an elastic foundation under axial load) for which the coefficients are computed and the imperfection-sensitivity is plotted.

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