Is it possible that in kalman-filter algorithm, 'Predicted estimate covariance' (P(k|k-1); see: http://en.wikipedia.org/wiki/Kalman_filter) be a singular matrix? or something is wring with my code?

This is the state-space model

```
% y{t}=Z{t} b{t} + eps{t}, eps{t} ~ N(0,H{t})
% b{t} = Pi{t} b{t-1} + tao{t} tao{t} ~ N(0,Q{t})
% b{1} ~ N(b0,P0)
% t=1,...,T
```

and this is the backward recursion as the main part of the kalman-filter algorithm:

```
for t=1:T
v{t} = y{t} - Z{t} * b_tt_1{t};
M{t} = P_tt_1{t} * Z{t}';
F{t} = Z{t} * M{t} + H{t};
F_{t}= inv(F{t});
MF_{t}= M{t} * F_{t};
b_tt{t}=b_tt_1{t} + MF_{t} * v{t};
P_tt{t}=P_tt_1{t} - MF_{t} * M{t}';
b_tt_1{t+1} = Pi{t} * b_tt{t};
P_tt_1{t+1} = Pi{t} * P_tt{t} * Pi{t}' + Q{t};
end
```

This happened when I used actual data. to see where the problem might be, I wrote a code to generate random state-space models ( I can provide the code, if it is needed).

When T is large, After some t0, P_tt_1{t0} is singular and the states (b{t0}) diverge.

Edit: I used "Joseph form" of the covariance update equation (see Wikipedia). It helped, but the result still diverges when the state-space model is Large (in sense of number of equations or states). I think this means the problem is related to numerical stability. So, the question is; Is there a way to solve it?

Please, somebody help me. thanks.

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indicating that your variables are all cell arrays, but arithmetic is not defined in Matlab for cell arrays!?! – Colin T Bowers Nov 22 '12 at 6:20