Fractional-Order System: Control Theory and Applications
Download Url(s)
https://mdpi.com/books/pdfview/book/6925Contributor(s)
Dinh, Thach Ngoc (editor)
Kamal, Shyam (editor)
Pandey, Rajesh Kumar (editor)
Language
EnglishAbstract
International experts contribute to Fractional- and Integer-Order System: Control Theory and Applications, providing an authoritative overview of the most recent developments in control theory as well as practical examples of fractional- and integer-order systems. Generously referenced and illustrated, the reprint highlights the growing interest in control science and is an invaluable resource for applied and industrial mathematicians, biological, control, electrical and electronics engineers and scientists.
Keywords
fractional fourier transform; weighted-type fractional fourier transform; multiweighted-type fractional Fourier transform; unitarity; direct autotuning methods; indirect autotuning methods; fractional-order controllers; simulation results; interval analysis; interval estimator; finite-time convergence; bounded uncertainties; infectious diseases; SEIR epidemic model; fractional calculus; neutral systems; fixed-point theory; distributed interval observer; fractional-order multiagent systems; monotone system theory; generalized Caputo derivate; fractional diffusion equation; finite difference method; collocation method; error; stability and convergence analysis; autonomous underwater vehicle; fuzzy logic control; particle swarm optimization algorithm; initial value problem; fractional differential systems; fractional integral equation; infinite-state approach; Riemann–Liouville integral; frequency distributed exponential function; fractional-order differential equations; verification of pseudo-state enclosures; Mittag-Leffler-type enclosures; exponential enclosures; fractional order; synchronization; event triggered; uncertain; n/aWebshop link
https://mdpi.com/books/pdfview ...ISBN
9783036564227, 9783036564234Publisher website
www.mdpi.com/booksPublication date and place
Basel, 2023Classification
Information technology industries
Computer science
Technology: general issues