Fractional-order system

In the fields of dynamical systems and control theory, a fractional-order system is a dynamical system that can be modeled by a fractional differential equation containing derivatives of non-integer order. ^[1] Such systems are said to have fractional dynamics. Derivatives and integrals of fractional orders are used to describe objects that can be characterized by power-law nonlocality, ^[2] power-law long-range dependence or fractal properties. Fractional-order systems are useful in studying the anomalous behavior of dynamical systems in physics, electrochemistry, biology, viscoelasticity and chaotic systems. ^[1]

Definition

A general dynamical system of fractional order can be written in the form ^[3]

${\displaystyle H(D^{\alpha _{1},\alpha _{2},\ldots ,\alpha _{m}})(y_{1},y_{2},\ldots ,y_{l})=G(D^{\beta _{1},\beta _{2},\ldots ,\beta _{n}})(u_{1},u_{2},\ldots ,u_{k})}$

where ${\displaystyle H}$ and ${\displaystyle G}$ are functions of the fractional derivative operator ${\displaystyle D}$ of orders ${\displaystyle \alpha _{1},\alpha _{2},\ldots ,\alpha _{m}}$ and ${\displaystyle \beta _{1},\beta _{2},\ldots ,\beta _{n}}$ and ${\displaystyle y_{i}}$ and ${\displaystyle u_{j}}$ are functions of time. A common special case of this is the linear time-invariant (LTI) system in one variable:

${\displaystyle \left(\sum _{k=0}^{m}a_{k}D^{\alpha _{k}}\right)y(t)=\left(\sum _{k=0}^{n}b_{k}D^{\beta _{k}}\right)u(t)}$

The orders ${\displaystyle \alpha _{k}}$ and ${\displaystyle \beta _{k}}$ are in general complex quantities, but two interesting cases are when the orders are commensurate

${\displaystyle \alpha _{k},\beta _{k}=k\delta ,\quad \delta \in R^{+}}$

and when they are also rational:

${\displaystyle \alpha _{k},\beta _{k}=k\delta ,\quad \delta ={\frac {1}{q}},q\in Z^{+}}$

When ${\displaystyle q=1}$, the derivatives are of integer order and the system becomes an ordinary differential equation. Thus by increasing specialization, LTI systems can be of general order, commensurate order, rational order or integer order.

Transfer function

By applying a Laplace transform to the LTI system above, the transfer function becomes

${\displaystyle G(s)={\frac {Y(s)}{U(s)}}={\frac {\sum _{k=0}^{n}b_{k}s^{\beta _{k}}}{\sum _{k=0}^{m}a_{k}s^{\alpha _{k}}}}}$

For general orders ${\displaystyle \alpha _{k}}$ and ${\displaystyle \beta _{k}}$ this is a non-rational transfer function. Non-rational transfer functions cannot be written as an expansion in a finite number of terms (e.g., a binomial expansion would have an infinite number of terms) and in this sense fractional orders systems can be said to have the potential for unlimited memory. ^[3]

Motivation to study fractional-order systems

Exponential laws are a classical approach to study dynamics of population densities, but there are many systems where dynamics undergo faster or slower-than-exponential laws. In such case the anomalous changes in dynamics may be best described by Mittag-Leffler functions. ^[4]

Anomalous diffusion is one more dynamic system where fractional-order systems play significant role to describe the anomalous flow in the diffusion process.

Viscoelasticity is the property of material in which the material exhibits its nature between purely elastic and pure fluid. In case of real materials the relationship between stress and strain given by Hooke's law and Newton's law both have obvious disadvances. So G. W. Scott Blair introduced a new relationship between stress and strain given by

${\displaystyle \sigma (t)=E{D_{t}^{\alpha }}\varepsilon (t),\quad 0<\alpha <1.}$^{[ citation needed ]}

In chaos theory, it has been observed that chaos occurs in dynamical systems of order 3 or more. With the introduction of fractional-order systems, some researchers study chaos in the system of total order less than 3. ^[5]

In neuroscience, it has been found that single rat neocortical pyramidal neurons adapt with a time scale that depends on the time scale of changes in stimulus statistics. This multiple time scale adaptation is consistent with fractional order differentiation, such that the neuron's firing rate is a fractional derivative of slowly varying stimulus parameters. ^[6]

Analysis of fractional differential equations

Consider a fractional-order initial value problem:

${\displaystyle {_{0}^{C}D_{t}^{\alpha }}x(t)=f(t,x(t)),\quad t\in [0,T],\quad x(0)=x_{0},\quad 0<\alpha <1.}$

Existence and uniqueness

Here, under the continuity condition on function f, one can convert the above equation into corresponding integral equation.

${\displaystyle x(t)=x_{0}+{_{0}^{C}D_{t}^{-\alpha }}f(t,x(t))=x_{0}+{\frac {1}{\Gamma (\alpha )}}\int _{0}^{t}{\frac {f(s,x(s))\,ds}{(t-s)^{1-\alpha }}},}$

One can construct a solution space and define, by that equation, a continuous self-map on the solution space, then apply a fixed-point theorem, to get a fixed-point, which is the solution of above equation.

Numerical simulation

For numerical simulation of solution of the above equations, Kai Diethelm has suggested fractional linear multistep Adams–Bashforth method or quadrature methods. ^[7]

See also

• Acoustic attenuation
• Differintegral
• Fractional calculus
• Fractional order control
• Fractional order integrator
• Fractional Schrödinger equation
• Fractional quantum mechanics

References

1. Monje, Concepción A. (2010). Fractional-Order Systems and Controls: Fundamentals and Applications. Springer. ISBN   9781849963350.
2. Cattani, Carlo; Srivastava, Hari M.; Yang, Xiao-Jun (2015). Fractional Dynamics. Walter de Gruyter KG. p. 31. ISBN   9783110472097.
3. Vinagre, Blas M.; Monje, C. A.; Calderon, Antonio J. "Fractional Order Systems and Fractional Order Control Actions" (PDF). 41st IEEE Conference on Decision and Control.
4. Rivero, M. (2011). "Fractional dynamics of populations". Appl. Math. Comput. 218 (3): 1089–95. doi:10.1016/j.amc.2011.03.017.
5. Petras, Ivo; Bednarova, Dagmar (2009). "Fractional–order chaotic systems". 2009 IEEE Conference on Emerging Technologies & Factory Automation. pp. 1–8. doi:10.1109/ETFA.2009.5347112. ISBN   978-1-4244-2727-7. S2CID   15126209.
6. Lundstrom, Brian N.; Higgs, Matthew H.; Spain, William J.; Fairhall, Adrienne L. (November 2008). "Fractional differentiation by neocortical pyramidal neurons". Nature Neuroscience. 11 (11): 1335–1342. doi:10.1038/nn.2212. ISSN   1546-1726. PMC   2596753 . PMID   18931665.
7. Diethelm, Kai. "A Survey of Numerical Methods in Fractional Calculus" (PDF). CNAM. Retrieved 6 September 2017.

Further reading

• West, Bruce; Bologna, Mauro; Grigolini, Paolo (2003). "3. Fractional Dynamics". Physics of Fractal Operators. Springer. pp. 77–120. ISBN   978-0-387-95554-4.
• Zaslavsky, George M. (23 December 2004). Hamiltonian Chaos and Fractional Dynamics. OUP Oxford. ISBN   978-0-19-852604-9.
• Lakshmikantham, V.; Leela, S.; Devi, J. Vasundhara (2009). Theory of Fractional Dynamic Systems. Cambridge Scientific.^{[ permanent dead link ]}
• Tarasov, V.E. (2010). Fractional Dynamics: Applications of Fractional Calculus to Dynamics of Particles, Fields and Media. Springer. ISBN   978-3-642-14003-7.
• Caponetto, R.; Dongola, G.; Fortuna, L.; Petras, I. (2010). Fractional Order Systems: Modeling and Control Applications. World Scientific. Bibcode:2010fosm.book.....C. Archived from the original on 2012-03-25. Retrieved 2016-10-17.
• Klafter, J.; Lim, S.C.; Metzler, R., eds. (2011). Fractional Dynamics. Recent Advances. World Scientific. doi:10.1142/8087. ISBN   978-981-4340-58-8.

• Li, Changpin; Wu, Yujiang; Ye, Ruisong, eds. (2013). Recent Advances in Applied Nonlinear Dynamics with Numerical Analysis: Fractional Dynamics, Network Dynamics, Classical Dynamics and Fractal Dynamics with Their Numerical Simulations. Interdisciplinary Mathematical Sciences. Vol. 15. World Scientific. doi:10.1142/8637. ISBN   978-981-4436-45-8.
• Igor Podlubny (27 October 1998). Fractional Differential Equations: An Introduction to Fractional Derivatives, Fractional Differential Equations, to Methods of Their Solution and Some of Their Applications. Elsevier. ISBN   978-0-08-053198-4.
• Miller, Kenneth S. (1993). Ross, Bertram (ed.). An Introduction to the Fractional Calculus and Fractional Differential Equations. Wiley. ISBN   0-471-58884-9.
• Oldham, Keith B.; Spanier, Jerome (1974). The Fractional Calculus; Theory and Applications of Differentiation and Integration to Arbitrary Order. Mathematics in Science and Engineering. Vol. V. Academic Press. ISBN   0-12-525550-0.

External links

• Fractional Calculus Applications in Automatic Control and Robotics A tutorial on fractional calculus, fractional order systems and fractional order control theory.