A new set of orthogonal functions and its application to the analysis of dynamic systems
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Publication:1033102
DOI10.1016/j.jfranklin.2005.06.005zbMath1173.33306OpenAlexW1998418157MaRDI QIDQ1033102
Gautam Sarkar, Anish Deb, Anindita Dasgupta
Publication date: 6 November 2009
Published in: Journal of the Franklin Institute (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jfranklin.2005.06.005
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Cites Work
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- All-integrator approach to linear SISO control system analysis using block pulse functions (BPF)
- Block pulse functions and their applications in control systems
- Walsh operational matrices for fractional calculus and their application to distributed systems
- A new set of piecewise constant orthogonal functions for the analysis of linear SISO systems with sample-and-hold
- Piecewise linear polynomial functions and applications to analysis and parameter identification
- Recursive formula for the multiple integral using block-pulse functions
- Generalized block-pulse operational matrices and their applications to operational calculus
- Block pulse functions, the most fundamental of all piecewise constant basis functions
- Analysis of linear discrete SISO control systems via a set of delta functions
- Linearly pulse-width modulated block pulse functions and their application to linear SISO feedback control system identification
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