Abstract

This paper develops an analytic framework to design both stress-controlled and displacement-controlledT-periodic loadings which make the quasistatic evolution of a one-dimensional network of elastoplastic springs converging to a unique periodic regime. The solution of such an evolution problem is a functiont↦(e(t),p(t)), whereei(t) is the elastic elongation andpi(t) is the relaxed length of springi, defined on [t0,∞) by the initial condition (e(t0),p(t0)). After we rigorously convert the problem into a Moreau sweeping process with a moving polyhedronC(t) in a vector spaceEof dimensiond, it becomes natural to expect (based on a result by Krejci) that the elastic componentt↦e(t) always converges to aT-periodic function ast→∞. The achievement of this paper is in spotting a class of loadings where the Krejci’s limit doesn’t depend on the initial condition (e(t0),p(t0)) and so all the trajectories approach the sameT-periodic regime. The proposed class of sweeping processes is the one for which the normals of anyddifferent facets of the moving polyhedronC(t) are linearly independent. We further link this geometric condition to mechanical properties of the given network of springs. We discover that the normals of anyddifferent facets of the moving polyhedronC(t) are linearly independent, if the number of displacement-controlled loadings is two less the number of nodes of the given network of springs and when the magnitude of the stress-controlled loading is sufficiently large (but admissible). The result can be viewed as an analogue of the high-gain control method for elastoplastic systems. In continuum theory of plasticity, the respective result is known as Frederick-Armstrong theorem.

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