Advanced search
Publication Cover
Engineering Optimization Volume 51, 2019 - Issue 9
Submit an article Journal homepage
239
Views
5
CrossRef citations to date
0
Altmetric
Original Articles

Order reduction of linear time-invariant systems using Eigen permutation and Jaya algorithm

Akhilesh K. GuptaElectrical Engineering Department, Motilal Nehru National Institute of Technology, Allahabad, IndiaCorrespondence[email protected]
,
Deepak KumarElectrical Engineering Department, Motilal Nehru National Institute of Technology, Allahabad, IndiaORCID Iconhttp://orcid.org/0000-0001-6967-4263
ORCID Icon &
Paulson SamuelElectrical Engineering Department, Motilal Nehru National Institute of Technology, Allahabad, India
Pages 1626-1643 | Received 12 Apr 2017, Accepted 17 Sep 2018, Published online: 16 Nov 2018

References

  • Antoulas, A. C., D. C. Sorensen, and S. Gugercin. 2001. “A Survey of Model Reduction Methods for Large-Scale Systems.” Contemporary Mathematics 280: 193–219. doi: 10.1090/conm/280/04630
  • Appiah, R. K. 1978. “Linear Model Reduction Using Hurwitz Polynomial Approximation.” International Journal of Control 28 (3): 477–488. doi: 10.1080/00207177808922472
  • Appiah, R. K. 1979. “Padè Methods of Hurwitz Polynomial Approximation with Application to Linear System Reduction.” International Journal of Control 29 (1): 39–48. doi: 10.1080/00207177908922678
  • Biradar, S., Y. V. Hote, and S. Saxena. 2016. “Reduced-Order Modeling of Linear Time Invariant Systems Using Big Bang Big Crunch Optimization and Time Moment Matching Method.” Applied Mathematical Modelling 40 (15–16): 7225–7244. doi: 10.1016/j.apm.2016.03.006
  • Chen, T. C., C. Y. Chang, and K. W. Han. 1980. “Stable Reduced-Order Padé Approximants Using Stability-Equation Method.” Electronics Letters 16 (9): 345–346. doi: 10.1049/el:19800248
  • Chen, C. F., and L. S. Shieh. 1968. “A Novel Approach to Linear Model Simplification.” International Journal of Control 8 (6): 561–570. doi: 10.1080/00207176808905715
  • Chuang, S. C. 1970. “Application of Continued-Fraction Method for Modelling Transfer Functions to Give More Accurate Initial Transient Response.” Electronics Letters 6 (26): 861–863. doi: 10.1049/el:19700592
  • Desai, S. R., and R. Prasad. 2013a. “A New Approach to Order Reduction Using Stability Equation and Big Bang Big Crunch Optimization.” Systems Science & Control Engineering 1 (1): 20–27. doi: 10.1080/21642583.2013.804463
  • Desai, S. R., and R. Prasad. 2013b. “A Novel Order Diminution of LTI Systems Using Big Bang Big Crunch Optimization and Routh Approximation.” Applied Mathematical Modelling 37 (16–17): 8016–8028. doi: 10.1016/j.apm.2013.02.052
  • Gallehdari, Z., M. Karrari, and O. P. Malik. 2009. “Model Order Reduction Using PSO Algorithm And It’s Application to Power Systems.” IEEE international conference on electric power and energy conversion systems, EPECS ‘09.
  • Goldberg, D. E. 1989. Genetic Algorithm in Search Optimization, and Machine Learning. Reading, MA: Addison-Wesley. ISBN 0201157675
  • Gugercin, S., and A. C. Antoulas. 2004. “A Survey of Model Reduction by Balanced Truncation and Some New Results.” International Journal of Control 77 (8): 748–766. doi: 10.1080/00207170410001713448
  • Gutman, P. O., C. F. Mannerfelt, and P. Molander. 1982. “Contributions to the Model Reduction Problem.” IEEE Transactions on Automatic Control 27 (2): 454–455. doi: 10.1109/TAC.1982.1102930
  • Hutton, M., and B. Friedland. 1975. “Routh Approximations for Reducing Order of Linear, Time-Invariant Systems.” IEEE Transactions on Automatic Control 20 (3): 329–337. doi: 10.1109/TAC.1975.1100953
  • Kennedy, J., and R. Eberhart. 1995. “Particle Swarm Optimization.” IEEE International Conference on Neural Networks 4: 1942–1948. doi: 10.1109/ICNN.1995.488968
  • Khanam, I., and G. Parmar. 2017. “Order Reduction of LTI Systems Using SFS.” International Journal of Electronics Electrical and Computational System 6 (3): 28–31.
  • Krishnamurthy, V., and V. Seshadri. 1978. “Model Reduction Using the Routh Stability Criterion.” IEEE Transactions on Automatic Control 23 (4): 729–731. doi: 10.1109/TAC.1978.1101805
  • Liaw, C. M. 1989. “Mixed Method of Model Reduction for Linear Multivariable Systems.” International Journal of Systems Science 20 (11): 2029–2041. doi: 10.1080/00207728908910285
  • Lucas, T. N. 1983. “Factor Division: A Useful Algorithm in Model Reduction.” IEE Proceedings D Control Theory and Applications 130 (6): 362–364. doi: 10.1049/ip-d.1983.0060
  • Mittal, A. K., R. Prasad, and S. P. Sharma. 2004. “Reduction of Linear Dynamic Systems Using an Error Minimization Technique.” Journal of Institution of Engineers IE(I) Journal – EL 84 (2): 201–206.
  • Mukherjee, S., and R. N. Mishra. 1987. “Order Reduction of Linear Systems Using an Error Minimization Technique.” Journal of the Franklin Institute 323 (1): 23–32. doi: 10.1016/0016-0032(87)90037-8
  • Mukherjee, S., Satakshi, and R. C. Mittal. 2005. “Model Order Reduction Using Response-Matching Technique.” Journal of the Franklin Institute. 342 (5): 503–519. doi: 10.1016/j.jfranklin.2005.01.008
  • Narwal, A., and B. R. Prasad. 2016. “A Novel Order Reduction Approach for LTI Systems Using Cuckoo Search Optimization and Stability Equation.” IETE Journal of Research 62 (2): 154–163. doi: 10.1080/03772063.2015.1075915
  • Pal, J. 1979. “Stable Reduced-Order Padé Approximants Using the Routh-Hurwitz Array.” Electronics Letters 15 (8): 225–226. doi: 10.1049/el:19790159
  • Pal, J. 1980. “System Reduction by a Mixed Method.” IEEE Transactions on Automatic Control 25 (5): 973–976. doi: 10.1109/TAC.1980.1102485
  • Panda, S., S. K. Tomar, R. Prasad, and C. Ardil. 2009. “Model Reduction of Linear Systems by Conventional and Evolutionary Techniques.” International Journal of Electrical and Computer Engineering 3 (11): 2150–2156.
  • Panda, S., J. S. Yadav, N. P. Patidar, and C. Ardil. 2012. “Evolutionary Techniques for Model Order Reduction of Large Scale Linear Systems.” International Journal Electrical and Computer Engineering 6 (9): 1105–1111.
  • Parmar, G., R. Prasad, and S. Mukherjee. 2007a. “Order Reduction of Linear Dynamic Systems Using Stability Equation Method and GA.” IJECEECE, World Academy of Science, Engineering and Technology 1 (2): 236–242.
  • Parmar, G., R. Prasad, and S. Mukherjee. 2007b. “System Reduction Using Factor Division Algorithm and Eigen Spectrum Analysis.” Applied Mathematical Modelling 31 (11): 2542–2552. doi: 10.1016/j.apm.2006.10.004
  • Parmar, G., R. Prasad, and S. Mukherjee. 2007c. “A Mixed Method for Large-Scale Systems Modelling Using Eigen Spectrum Analysis and Cauer Second Form.” IETE Journal of Research 53 (2): 93–102. doi: 10.1080/03772063.2007.10876125
  • Philip, B., and J. Pal. 2010. “An Evolutionary Computation Based Approach for Reduced Order Modelling of Linear Systems.” Presented at the 2010 IEEE International Conference on Computational Intelligence and Computing Research, Coimbatore, India, December 28–29.
  • Prasad, R., S. P. Sharma, and A. K. Mittal. 2003. “Linear Model Reduction Using the Advantages of Mihailov Criterion and Factor Division.” Journal of Institution of Engineers India 84: 7–10.
  • Rao, R. V., and G. G. Waghmare. 2017. “A New Optimization Algorithm for Solving Complex Constrained Design Optimization Problems.” Engineering Optimization 49 (1): 60–83. doi: 10.1080/0305215X.2016.1164855
  • Satakshi, S. Mukherjee, and R. C. Mittal. 2005. “Order Reduction of Linear Discrete Systems Using a Genetic Algorithm.” Applied Mathematical Modelling 29 (6): 565–578. doi: 10.1016/j.apm.2004.09.016
  • Shamash, Y. 1974. “Stable Reduced-Order Models Using Padé-Type Approximations.” IEEE Transactions on Automatic Control 19 (5): 615–616. doi: 10.1109/TAC.1974.1100661
  • Shamash, Y. 1975. “Linear System Reduction Using Padè Approximation to Allow Retention of Dominant Modes.” International Journal of Control 21 (2): 257–272. doi: 10.1080/00207177508921985
  • Shamash, Y. 1976. “Continued Fraction Methods for the Reduction of Constant-Linear Multivariable Systems.” International Journal of Systems Science 7 (7): 743–758. doi: 10.1080/00207727608941961
  • Shieh, L. S., and M. J. Goldman. 1974. “A Mixed Cauer Form for Linear System Reduction.” IEEE Transactions on Systems, Man and Cybernatics SMC 4 (6): 584–588.
  • Sikander, A., and R. Prasad. 2015a. “Linear Time-Invariant System Reduction Using a Mixed Methods Approach.” Applied Mathematical Modelling 39 (16): 4848–4858. doi: 10.1016/j.apm.2015.04.014
  • Sikander, A., and R. Prasad. 2015b. “Soft Computing Approach for Model Order Reduction of Linear Time Invariant Systems.” Circuits, Systems, and Signal Processing 34 (11): 3471–3487. doi: 10.1007/s00034-015-0018-4
  • Singh, J., K. Chatterjee, and C. B. Vishwakarma. 2014. “System Reduction by Eigen Permutation Algorithm and Improved Padé Approximations.” IJMCPECE, World Academy of Science, Engineering and Technology 8 (1): 180–184.
  • Singh, J., C. B. Vishwakarma, and K. Chatterjee. 2016. “Biased Reduction Method by Combining Improved Modified Pole Clustering and Improved Padè Approximants.” Applied Mathematical Modelling 40 (2): 1418–1426. doi: 10.1016/j.apm.2015.07.014
  • Soloklo, H. N., and M. M. Farsangi. 2013. “Chebyshev Rational Functions Approximation for Model Order Reduction Using Harmony Search.” Scientia Iranica 20 (3): 771–777.
  • Vishwakarma, C. B. 2009. “Model Order Reduction Using of Linear Dynamic Systems for Control System Design.” PhD thesis, IIT Roorkee, Roorkee, India.
  • Vishwakarma, C. B., and R. Prasad. 2009. “MIMO System Reduction Using Modified Pole Clustering and Genetic Algorithm.” Modelling and Simulation in Engineering 2009, Article ID 540895: 1–5. doi:10.1155/2009/540895.
  • Wan, B.-W. 1981. “Linear Model Reduction Using Mihailov Criterion and Padé Approximation Technique.” International Journal of Control 33 (6): 1073–1089. doi: 10.1080/00207178108922977
  • Wilson, D. A. 1970. “Optimum Solution of Model-Reduction Problem.” Proceedings of the Institution of Electrical Engineers 117 (6): 1161–1165. doi: 10.1049/piee.1970.0227
  • Wilson, D. A. 1974. “Model Reduction for Multivariable Systems.” International Journal of Control 20 (1): 57–64. doi: 10.1080/00207177408932715
  • Yadav, J. S., N. P. Patidar, J. Singhai, and C. Ardil. 2011. “A Combined Conventional and Differential Evolution Method for Model Order Reduction.” World Academy of Science, Engineering and Technology 5 (9): 1284–1291.
  • Zakian, V. 1973. “Simplification of Linear Time-Invariant Systems by Moment Approximants.” International Journal of Control 18 (3): 455–460. doi: 10.1080/00207177308932525

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.