# MATLAB: How to make the Hermitean matrix from specific complex vectors?

Is given:
stationary mass ` ms=1;`
Eta-constant ` eta=0.45;`
variable number of repetitions, e.g. ` N=5;`
omega ` OM=sqrt(ks/ms);`
angular frequency ` om=eta*OM;`
time period ` T=2*pi/om;`
upper bound ` TTT=1.5;`
variable for creating function ` t=0:0.001:TTT; `

I made a function like that:

``````kt=zeros(size(t));
for j=1:2*N+1
n= j-(N+1);
if n==0
k(j)=ks/2;
else
k(j)=i/pi/n;
end
kt=kt+k(j)*exp(i*n*om*t);
end
``````

It’s a Sawtooth wave and there is my problem. From the complex vector kt with value 1x1501 double I have to make the Hermitean matrix for variable N. This means that N can be 5, can be 50, 100, etc. The matrix should look like (picture):

Where k1 is k for N=1, k0 is k for N=0 or k-1 is k for N=-1. Size of matrix is 2*N+1 and 2*N+1.

Thank you for your help and responding!

-

That's a Toeplitz matrix, you can use the `toeplitz` command to generate the matrix above. In the general case, this would have been written as:

``````H = toeplitz(kt(N:end), kt(1:N + 1))
``````

where the first N values in `kt` correspond to k-N, ... k-1, and the last N + 1 values are k0, ... kN. However, since `H` is Hermitian, this can be simplified to:

``````H = toeplitz(kt(N:end));
``````
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Thank you, I knew that is specific matrix, but I couldn't remember the name :) –  Karel Drazdil Jun 30 '13 at 18:41

Try this code:

``````k=[1 2+i 3+i 4+i 5+i];
N=7;
M=diag(k(1)*ones(N,1));

for j=1:length(k)-1
M=M+diag(k(j+1)*ones(N-j,1),j)+diag(conj(k(j+1))*ones(N-j,1),-j)
end;
``````

Here N should be equal or greater than the length of k array

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Thank you, it's usefull too ;) –  Karel Drazdil Jun 30 '13 at 18:38