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levin

(多次元)LevinsonアルゴリズムによりToeplitz システムを解く

呼び出し手順

[la,sig]=levin(n,cov)

引数

n

整数値のスケール: フィルタの最大次数

cov

(nlag*d) x d 行列. Rkを有します 以下のように保存されたRk (d次の過程の場合はd x d行列)を有します:

\begin{eqnarray}

                            \begin{pmatrix}

                            R_0\\R_1\\R_2\\ \vdots \\R_{nlags}

                            \end{pmatrix}

                            \end{eqnarray}

la

リスト, 再帰的に計算された係数をAk とするLevinson多項式 (次数は1からn),

sig

リスト, 一連の二乗誤差平均.

説明

以下のToeplitzシステム(正規方程式)をnについて再帰的に 解く関数

\begin{eqnarray}

                \begin{pmatrix}

                I&-A_1&\cdots&-A_n

                \end{pmatrix}

                \ast

                \begin{pmatrix}

                R_1&R_2&\cdots&R_n \\

                R_0&R_1&\cdots&R_{n-1} \\

                R_{-1}&R_0&\cdots&R_{n-2} \\

                \vdots&\vdots&\cdots&\vdots \\

                R_{2-n}&R_{3-n}&\cdots&R_1 \\

                R_{1-n}&R_{2-n}&\cdots&R_0

                \end{pmatrix}

                = 0

                \end{eqnarray}

ただし, {Rk;k=1:nlag} は nlag個の経験的共分散の系列です.

//We use the 'levin' macro for solving the normal equations
//on two examples: a one-dimensional and a two-dimensional process.
//We need the covariance sequence of the stochastic process.
//This example may usefully be compared with the results from
//the 'phc' macro (see the corresponding help and example in it)
//
//
//1) A one-dimensional process
//   -------------------------
//
//We generate the process defined by two sinusoids (1Hz and 2 Hz)
//in additive Gaussian noise (this is the observed process);
//the simulated process is sampled at 10 Hz (step 0.1 in t, underafter).
t1=0:.1:100;rand('normal');
y1=sin(2*%pi*t1)+sin(2*%pi*2*t1);y1=y1+rand(y1);plot(t1,y1);
//covariance of y1
nlag=128;
c1=corr(y1,nlag);
c1=c1';//c1 needs to be given columnwise (see the section PARAMETERS of this help)
//compute the filter for a maximum order of n=10
//la is a list-type variable each element of which
//containing the filters of order ranging from 1 to n; (try varying n)
//in the d-dimensional case this is a matrix polynomial (square, d X d)
//sig gives, the same way, the mean-square error
n=15;
[la1,sig1]=levin(n,c1);
//verify that the roots of 'la' contain 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 (1Hz and 2 Hz) through
//the log and correct scaling by the frequency sampling)
//we verify this for each filter order
for i=1:n, s1=roots(la1(i));s1=log(s1)/2/%pi/.1;
//now we get the estimated poles (sorted, positive ones only !)
s1=gsort(imag(s1));s1=s1(1:i/2);end;
//the last two frequencies are the ones really present in the observed
//process ---> the others are "artifacts" coming from the used model size.
//This is related to the rather difficult problem of order estimation.
//
//2) A 2-dimensional process
//   -----------------------
//(4 frequencies 1, 2, 3, and 4 Hz, sampled at 0.1 Hz :
//   |y_1|        y_1=sin(2*Pi*t)+sin(2*Pi*2*t)+Gaussian noise
// y=|   | with :
//   |y_2|        y_2=sin(2*Pi*3*t)+sin(2*Pi*4*t)+Gaussian noise
d=2;dt=0.1;
nlag=64;
t2=0:2*%pi*dt:100;
y2=[sin(t2)+sin(2*t2)+rand(t2);sin(3*t2)+sin(4*t2)+rand(t2)];
c2=[];
for j=1:2, for k=1:2, c2=[c2;corr(y2(k,:),y2(j,:),nlag)];end;end;
c2=matrix(c2,2,128);cc=[];
for j=1:64,cc=[cc;c2(:,(j-1)*d+1:j*d)];end;//covar. columnwise
c2=cc;
//in the multidimensional case, we have to compute the
//roots of the determinant of the matrix polynomial
//(easy in the 2-dimensional case but tricky if d>=3 !).
//We just do that here for the maximum desired
//filter order (n); mp is the matrix polynomial of degree n
[la2,sig2]=levin(n,c2);
mp=la2(n);determinant=mp(1,1)*mp(2,2)-mp(1,2)*mp(2,1);
s2=roots(determinant);s2=log(s2)/2/%pi/0.1;//same trick as above for 1D process
s2=gsort(imag(s2));s2=s2(1:d*n/2);//just the positive ones !
//There the order estimation problem is seen to be much more difficult !
//many artifacts ! The 4 frequencies are in the estimated spectrum
//but beneath many non relevant others.

参照

  • phc — マルコフ表現
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