期刊
COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION
卷 39, 期 -, 页码 504-519出版社
ELSEVIER
DOI: 10.1016/j.cnsns.2016.04.004
关键词
Magnetostrictive materials; Hysteresis; Energy harvesting; Optimization problems
类别
资金
- GACR [GA15-12227S, RVO:67985840]
- DFG [SFB 787]
- NSF [DMS-1413223]
- Italian research project PON Low Noise, Ministero Dell'Istruzione, Universita e Ricerca (MIUR) [PON01-01878]
- Division Of Mathematical Sciences
- Direct For Mathematical & Physical Scien [1413223] Funding Source: National Science Foundation
We present a model of, and analysis of an optimization problem for, a magnetostrictive harvesting device which converts mechanical energy of the repetitive process such as vibrations of the smart material to electrical energy that is then supplied to an electric load. The model combines a lumped differential equation for a simple electronic circuit with an operator model for the complex constitutive law of the magnetostrictive material. The operator based on the formalism of the phenomenological Preisach model describes nonlinear saturation effects and hysteresis losses typical of magnetostrictive materials in a thermodynamically consistent fashion. We prove well-posedness of the full operator-differential system and establish global asymptotic stability of the periodic regime under periodic mechanical forcing that represents mechanical vibrations due to varying environmental conditions. Then we show the existence of an optimal solution for the problem of maximization of the output power with respect to a set of controllable parameters (for the periodically forced system). Analytical results are illustrated with numerical examples of an optimal solution. (C) 2016 Elsevier B.V. All rights reserved.
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