Szczegóły

Tytuł artykułu

Linear Dynamic System Identification in the Frequency Domain Using Fractional Derivatives

Tytuł czasopisma

Metrology and Measurement Systems

Rocznik

2010

Numer

No 2

Autorzy

Wydział PAN

Nauki Techniczne

Wydawca

Polish Academy of Sciences Committee on Metrology and Scientific Instrumentation

Data

2010

Identyfikator

ISSN 0860-8229

Referencje

Axtell M. (1990), Fractional calculus applications in control systems, null, 563. ; Bagley R. (1984), On the appearance of the fractional derivative in the behavior of real materials, J. Appl. Mech, 51, 294. ; Eykhoff P. (1974), System identification. Parameter and Sate Estimation. ; Janiczek T. (2001), Analysis of PVDF transducer signals stimulated by mechanical tension, Journal of Electrostatics, 51-52, 167. ; Janiczek, T. (2003). <i>Models of systems described by fractional differential equations and basic algorithms of their identification. Ph.D. Thesis</i>, Wroclaw University of Technology. ; Levy E. (1959), Complex curve fitting, IRE Trans. Aut. Contr, 4, 37. ; MacDonald J. (1987), Impedance Spectroscopy: Emphasis Solid Materials and Systems. ; Miller K. (1993), An Introduction to the Fractional Calculus and Fractional Differential Equations. ; Podlubny I. (1999), Fractional Differential Equations. ; Sawaragi Y. (1981), Classical Methods and time series estimation. Trends And Progress In System Identification. ; Janiczek T. (2005), Equivalent model of modified bismuth oxides described by fractional derivatives, null. ; Nowak-Woźny D. (2009), Fractional electrical model for modified bismuth oxide, Journal of Electrostatics, 67, 18.

DOI

10.2478/v10178-010-0024-6

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