Scilab Website | Contribute with GitLab | Mailing list archives | ATOMS toolboxes
Scilab Online Help
5.5.0 - Português

Change language to:
English - Français - 日本語 - Русский

Please note that the recommended version of Scilab is 2025.0.0. This page might be outdated.
See the recommended documentation of this function

Ajuda do Scilab >> Processamento de Sinais > filters > faurre

faurre

filter computation by simple Faurre algorithm

Calling Sequence

[P,R,T]=faurre(n,H,F,G,R0)

Arguments

n

number of iterations.

H, F, G

estimated triple from the covariance sequence of y.

R0

E(yk*yk')

P

solution of the Riccati equation after n iterations.

R, T

gain matrix of the filter.

Description

This function computes iteratively the minimal solution of the algebraic Riccati equation and gives the matrices R and T of the filter model. The algorithm tries to compute the solution P as the growing limit of a sequence of matrices Pn such that

-1
Pn+1=F*Pn*F'+(G-F*Pn*h')*(R0-H*Pn*H')  *(G'-H*Pn*F')
-1
P0=G*R0 *G'

Note that this method may not converge,especially when F has poles near the unit circle. Use preferably the srfaur function.

See Also

  • srfaur — square-root algorithm
  • lindquist — Lindquist's algorithm
  • phc — Markovian representation
Report an issue
<< eqiir filters ffilt >>

Copyright (c) 2022-2024 (Dassault Systèmes)
Copyright (c) 2017-2022 (ESI Group)
Copyright (c) 2011-2017 (Scilab Enterprises)
Copyright (c) 1989-2012 (INRIA)
Copyright (c) 1989-2007 (ENPC)
with contributors
Last updated:
Fri Apr 11 14:18:12 CEST 2014