Fractional Calculus and the Future of Science
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| Autore: |
West Bruce J
|
| Titolo: |
Fractional Calculus and the Future of Science
|
| Pubblicazione: | Basel, : MDPI - Multidisciplinary Digital Publishing Institute, 2022 |
| Descrizione fisica: | 1 online resource (312 p.) |
| Soggetto topico: | Mathematics and Science |
| Research and information: general | |
| Soggetto non controllato: | big data |
| chaos | |
| complex systems | |
| complexity | |
| continuous time random walk | |
| continuous time random walks | |
| control theory | |
| diffusion-wave equation | |
| distributed-order operators | |
| diversity | |
| Dow Jones | |
| entropy | |
| false positive rate | |
| financial indices | |
| fractals | |
| fractional calculus | |
| fractional conservations laws | |
| fractional diffusion | |
| fractional dynamics | |
| fractional order PID control | |
| fractional PINN | |
| fractional Poisson process complex systems | |
| fractional relaxation | |
| fractional telegrapher's equation | |
| fractional-order thinking | |
| frequency-domain control design | |
| Gaussian watermarks | |
| heavytailedness | |
| Laplace and Fourier transform | |
| Lévy measure | |
| liouville-caputo fractional derivative | |
| local discontinuous Galerkin methods | |
| logistic differential equation | |
| machine learning | |
| Mittag-Leffler functions | |
| multidimensional scaling | |
| n/a | |
| optimal tuning | |
| physics-informed learning | |
| PMSM | |
| Poisson process of order k | |
| reaction kinetics | |
| reaction-diffusion equations | |
| running average | |
| semi-fragile watermarking system | |
| Skellam process | |
| stability estimate | |
| statistical assessment | |
| subordination | |
| telegrapher's equations | |
| transport problems | |
| transport processes | |
| turbulent flows | |
| variability | |
| variable fractional model | |
| viscoelasticity | |
| Wright functions | |
| Persona (resp. second.): | WestBruce J |
| Sommario/riassunto: | Newton foresaw the limitations of geometry's description of planetary behavior and developed fluxions (differentials) as the new language for celestial mechanics and as the way to implement his laws of mechanics. Two hundred years later Mandelbrot introduced the notion of fractals into the scientific lexicon of geometry, dynamics, and statistics and in so doing suggested ways to see beyond the limitations of Newton's laws. Mandelbrot's mathematical essays suggest how fractals may lead to the understanding of turbulence, viscoelasticity, and ultimately to end of dominance of the Newton's macroscopic world view.Fractional Calculus and the Future of Science examines the nexus of these two game-changing contributions to our scientific understanding of the world. It addresses how non-integer differential equations replace Newton's laws to describe the many guises of complexity, most of which lay beyond Newton's experience, and many had even eluded Mandelbrot's powerful intuition. The book's authors look behind the mathematics and examine what must be true about a phenomenon's behavior to justify the replacement of an integer-order with a noninteger-order (fractional) derivative. This window into the future of specific science disciplines using the fractional calculus lens suggests how what is seen entails a difference in scientific thinking and understanding. |
| Titolo autorizzato: | Fractional Calculus and the Future of Science |
| Formato: | Materiale a stampa  |
| Livello bibliografico | Monografia |
| Lingua di pubblicazione: | Inglese |
| Record Nr.: | 9910566468103321 |
| Lo trovi qui: | Univ. Federico II |
| Opac: | Controlla la disponibilità qui |