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dimension of the observation
desired dimension of the state vector for the approximated model
- H, F, G
relevant matrices of the Markovian model
Function which computes the matrices
H, F, G of a Markovian
representation by the principal hankel
component approximation method, from the hankel matrix built
from the covariance sequence of a stochastic process.
//This example may usefully be compared with the results from //the 'levin' macro (see the corresponding help and example) // //We consider the process defined by two sinusoids (1Hz and 2 Hz) //in additive Gaussian noise (this is the observation); //the simulated process is sampled at 10 Hz. t=0:.1:100;rand('normal'); y=sin(2*%pi*t)+sin(2*%pi*2*t);y=y+rand(y);plot(t,y) //covariance of y nlag=128; c=corr(y,nlag); //hankel matrix from the covariance sequence //(we can choose to take more information from covariance //by taking greater n and m; try it to compare the results ! n=20;m=20; h=hank(n,m,c); //compute the Markov representation (mh,mf,mg) //We just take here a state dimension equal to 4 : //this is the rather difficult problem of estimating the order ! //Try varying ns ! //(the observation dimension is here equal to one) ns=4; [mh,mf,mg]=phc(h,1,ns); //verify that the spectrum of mf contains the //frequency spectrum of the observed process y //(remember that y is sampled -in our example //at 10Hz (T=0.1s) so that we need //to retrieve the original frequencies through the log //and correct scaling by the frequency sampling) s=spec(mf);s=log(s); s=s/2/%pi/.1; //now we get the estimated spectrum imag(s),
- levin — Toeplitz system solver by Levinson algorithm (multidimensional)
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