This note ties the Laguerre continued fraction expansion of the Tustin fractional discrete-time operator to irreducible Jacobi tri-diagonal matrices. The aim is to prove that the Laguerre approximation to the Tustin fractional operator s(-v) (or s(v)) is stable and minimum-phase for any value 0 < v < 1 of the fractional order v. It is also shown that zeros and poles of the approximation are interlaced and lie in the unit circle of the complex z-plane, keeping a special symmetry on the real axis. The quality of the approximation is analyzed both in the frequency and time domain. Truncation error bounds of the approximants are given.
On the Laguerre Rational Approximation to Fractional Discrete Derivative and Integral Operators / Maione, Guido. - In: IEEE TRANSACTIONS ON AUTOMATIC CONTROL. - ISSN 0018-9286. - 58:6(2013), pp. 1579-1585. [10.1109/TAC.2013.2244273]
On the Laguerre Rational Approximation to Fractional Discrete Derivative and Integral Operators
MAIONE, Guido
2013-01-01
Abstract
This note ties the Laguerre continued fraction expansion of the Tustin fractional discrete-time operator to irreducible Jacobi tri-diagonal matrices. The aim is to prove that the Laguerre approximation to the Tustin fractional operator s(-v) (or s(v)) is stable and minimum-phase for any value 0 < v < 1 of the fractional order v. It is also shown that zeros and poles of the approximation are interlaced and lie in the unit circle of the complex z-plane, keeping a special symmetry on the real axis. The quality of the approximation is analyzed both in the frequency and time domain. Truncation error bounds of the approximants are given.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
