Abstract
This paper uses a set of hybrid functions (HF) formed by a combination of sample-and-hold function (SHF) set and triangular function (TF) set. The SHF set has been applied for analysing sample-and-hold control systems and the TF set has been proved to be efficient for obtaining piecewise linear solutions of control systems. In the present work, the HF set has been employed for the analysis and synthesis of homogeneous as well as non-homogeneous time-varying control systems in state space. The HF set works with function samples, and is thus useful for building an easier algorithm for time-varying system analysis. After developing necessary theories, a few examples are treated to illustrate the efficiency as well as simplicity of the approach. The results thus obtained are compared with the results obtained via traditional analysis, and relevant tables and graphs are included to justify the case for hybrid functions.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Deb A, Sarkar G, Bhattacharjee M, Sen SK (1998) A new set of piecewise constant orthogonal functions for the analysis of linear SISO systems with sample-and-hold. J Frankl Inst 335B(2):333–358
Rao GP (1983) Piecewise constant orthogonal functions and their application to systems and control, LNCIS series, vol 55. Springer-Verlag, Berlin
Unbehauen H, Rao GP (1987) Identification of continuous systems. North-Holland Systems and Control Series, Amsterdam
Sinha SC, Butcher EA (1997) Symbolic computation of fundamental solution matrices for linear time periodic dynamical systems. J Sound Vib 206(1):61–85
Deshmukh V (2008) Spectral collocation based optimization in parameter estimation for nonlinear time varying dynamical systems. J Comput Nonlinear Dyn (ASME) 3(1):011010–011017
Deb A, Sarkar G, Dasgupta A (2003) A complementary pair of orthogonal triangular function sets and its application to the analysis of SISO control systems. J Inst Eng (India) 84:120–129
Deb A, Dasgupta A, Sarkar G (2006) A new set of orthogonal functions and its application to the analysis of dynamic systems. J Frankl Inst 343:1–26
Deb A, Sarkar G, Sengupta A (2011) Triangular orthogonal functions for the analysis of continuous time systems. Anthem Press, London
Deb A, Sarkar G, Mandal P, Biswas A, Ganguly A, Biswas D (2012) Transfer function identification from impulse response via a new set of orthogonal hybrid functions (HF). Appl Math Comput 218(9):4760–4787
Jiang JH, Schaufelberger W (1992) Block pulse functions and their application in control system, LNCIS-179. Springer-Verlag, Berlin
Deb A, Sarkar G, Sen SK (1994) Block pulse functions, the most fundamental of all piecewise constant basis functions. Int J Syst Sci 25(2):351–363
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Roychoudhury, S., Deb, A. & Sarkar, G. Analysis and synthesis of time-varying systems via orthogonal hybrid functions (HF) in state space environment. Int. J. Dynam. Control 3, 389–402 (2015). https://doi.org/10.1007/s40435-014-0129-y
Received:
Revised:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s40435-014-0129-y