Czasopismo
2009
|
Vol. 35, nr 1
|
63-70
Tytuł artykułu
Autorzy
Wybrane pełne teksty z tego czasopisma
Warianty tytułu
Języki publikacji
Abstrakty
Purpose: Present paper is continuation of earlier publications with stack of piezoelectric plates. This work is an author’s idea of calculations of complex systems with many elements. Design/methodology/approach: The base of calculation is matrix method and application of aggregation of graphs to determination characteristic parameters of bimorphic systems, as well as to drawing its characteristics. Findings: The analysis of complex piezoelectric system was shown to determinate characteristics of it. Research limitations/implications: In the article problem of mechatronic system analysis on example of longitudinal vibration of piezoelectric plates was presented. In the future analysis of plate with bending vibration will be done. Practical implications: Presented analysis method of piezoelectric effect in complex systems is well suited for determining the flexibility of bimorphic stack of piezoelectric plates in vibration sensors. This sensors are used to the level detection of materials. Originality/value: Thanks to the approach, introduced in this paper, analysis of bimorph system was done by means of the graph and structural numbers method.
Rocznik
Tom
Strony
63-70
Opis fizyczny
Bibliogr. 28 poz., rys., tabl.
Twórcy
autor
autor
- Institute of Engineering Processes Automation and Integrated Manufacturing Systems, Silesian University of Technology, ul. Konarskiego 18a, 44-100 Gliwice, Poland, andrzej.wrobel@polsl.pl
Bibliografia
- [1] K. Arczewski, Structural Methods of the Complex Mechanical Systems Analysis, WPW, Warsaw, 1988.
- [2] S. Bellert, Chosen works, PWN, Warsaw, 1981.
- [3] M. Białko, Active filters RC, WNT, Warsaw, 1979.
- [4] C. Berg, Graphs and hypergraphs. Amsterdam-London:North Holland Publishing Co, American Elsevier Publishing Co, Inc., New York, 1973.
- [5] R. E. D. Bishop, G. M. L. Gladwell, S. Michaelson, Matrix analysis of vibration, WNT, Warsaw, 1972.
- [6] S. Bolkowski, Theoretical electrical engineering, WNT, Warsaw, 1986.
- [7] A. Buchacz, J. Świder, Skeletons hypergraph in modeling, examination and position robot’s manipulator and subassembly of machines, Silesian University of Technology Press, Gliwice, 2000.
- [8] A. Buchacz, Hypergrphs and their subgraphs in modelling and investigation of robots, Journal of Materials Processing Technology 157-158 (2004) 37-44.
- [9] S. Żółkiewski, Dynamical flexibilities of mechanical rotational systems,Journal of Achievements in Materials and Manufacturing Engineering 31/2 (2008) 602-609.
- [10] A. Buchacz, S. Żółkiewski, Longitudinal vibrations of the flexible n-bar manipulator in terms of plane motion and taking into consideration the transportation effect, Proceedings of the 7th International Conference on Computer Integrated Manufacturing - Intelligent Manufacturing Systems, Gliwice – Wisła, 2005, 26-29.
- [11] A. Buchacz, Dynamical flexibility of discretecontinuous vibrating mechatronic system, Journal of Achievements in Materials and Manufacturing Engineering 28/2 (2008) 159-166.
- [12] A. Buchacz, A. Wróbel, The investigation of the piezoelectric effect of bimorph system and his practical application in level sensors, XII The Scientific conference, of vibroacoustics and vibrotechnique, Jachranka, 2007, 63-66.
- [13] A. Buchacz, A. Wróbel, The analysis of simple and complex piezoelectric systems, XVII Sympozjon “The modelling in the mechanics”, project N 502 071 31/3719, Wisla, 2008, 25-29.
- [14] K. Białas, Graphs and structural numbers in analysis and synthesis of mechanical systems, Journal of Achievements in Materials and Manufacturing Engineering 29/2 (2008) 151-154.
- [15] Z. Bychawski, The mechanics of continuous centres. University of Rzeszów, Press, Rzeszów, 1979.
- [16] L.-W. Chen, C.-Y. Lin, C.-C Wang, Dynamic stability analysis and control of a composite beam with piezoelectric layers, Composite Structures 56/1 (2002) 97-109.
- [17] S. K. Ha, Analysis of a piezoelectric multimorph in extensional and flexular motions, Journal of Sound and Vibration 253/3 (2002) 1001-1014,
- [18] B. Heimann, W. Gerth, K. Popp, Mechatronic - components, methods, examples, PWN, Warsaw, 2001.
- [19] R. Kacprzyk, E. Motyl, J.B. Gajewski, A. Pasternak, Piezoelectric properties of nouniform electrets, Journal of Electrostatics 35 (1995) 161-166.
- [20] G.Q Li, Chen Chuan-Yao, Hu Yuan-Tai, Equivalent electric circuits of thin plates with two-dimensional piezoelectric actuators, Journal of Sound and Vibration 286 (2005) 145-165.
- [21] W. P. Mason, Electromechanical Transducers and Wale Filters, Van Nostrand, 1948.
- [22] W. P. Mason, Physical acoustics and the properties of solids, Princeton NJ, Van Nostrand, 1958.
- [23] S. Sherrit, S. P. Leary, B. P. Dolgin, Comparison of the Mason and KLM equivalent circuits for piezoelectric resonators in thickness mode, Ultrasonics Symposium, 1999.
- [24] H. Shin, H. Ahn, D. Y. Han, Modeling and analysis of multilayer piezoelectric transformer, Materials Chemistry and Physics 92 (2005) 616-620.
- [25] W. Soluch, The introduction to piezoelectronics, WKi, Warsaw, 1980,
- [26] A. Sękala, J. Świder, Hybrid Graphs in Modelling and Analysis of Discrete–Continuous Mechanical Systems, Journal of Materials Processing Technology 164-165 (2005) 1436-1443.
- [27] A. Sękala, J. Świder, Analysis of continuous mechanical systems by means of signal flow graphs, Proceedings of the 7th International Conference on Computer Integrated Manufacturing - Intelligent Manufacturing Systems, Gliwice – Wisła, 2005, 208-211.
- [28] G. Wszołek, Modelling of mechanical systems vibrations by utilisation of GRAFSIM software, Journal of Materials Processing Technology 164-165 (2005) 1466-1471.
Typ dokumentu
Bibliografia
Identyfikatory
Identyfikator YADDA
bwmeta1.element.baztech-article-BOS2-0020-0063