Application of single-step method of block-pulse functions to the optimal control of linear distributed-parameter systems
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Publication:3809665
DOI10.1080/00207728808547126zbMath0659.93034OpenAlexW2011433343MaRDI QIDQ3809665
Publication date: 1988
Published in: International Journal of Systems Science (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00207728808547126
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Related Items (2)
Implementation of multi-rate model reference adaptive control for continuous systems via bilinear transformation based on block-pulse functions ⋮ Optimal control of a parabolic distributed parameter system using a fully exponentially convergent barycentric shifted Gegenbauer integral pseudospectral method
Cites Work
- Solution of integral equations using a set of block pulse functions
- Optimal Control of Linear Distributed Parameter Systems by Shifted Legendre Polynomial Functions
- Application of shifted Chebyshev series to the optimal control of linear distributed-parameter systems
- Solution of optimal control problem of linear diffusion equations via Walsh functions
- Extension of computation beyond the limit of initial normal interval in Walsh series analysis of dynamical systems
- Linear feedback system identification via block-pulse functions
- Block pulse series analysis of scaled systems
- Generalized block-pulse operational matrices and their applications to operational calculus
- Identification of non-linear distributed systems via block-pulse functions
- Explicit solutions of integral equations via block pulse functions
- Solution of state-space equations via block-pulse functions
- Optimal feedback control via block-pulse functions
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