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If P( cj | xi ) are already known, where i=1,2,...n; j=1,2,...k;

How do I calculate/estimate: P( cj | xl , xm , xn ), where j=1,2,...k; l,m,n belongs to {1,2,...n} ?

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probably better on mathoverflow.net –  Paul Creasey Apr 11 '10 at 15:12
I don't think so,they only accept questions of mathematician level and this question is more about implementation. –  user198729 Apr 11 '10 at 15:13
Don't you mean "probability problem"? –  Andreas Rejbrand Apr 11 '10 at 19:06
@Andreas: fixed :) –  Amro Apr 11 '10 at 19:08

3 Answers 3

EDIT2 (following the OP's comment)

From bayes rule we know that P(C|x1,x2,x3) ~ P(C)*P(x1,x2,x3|C) and therefore for classification, you compute that expression for all C=j and predict the most likely class (MAP).

Now to compute P(x1,x2,x3|C), for i.i.d observations, this can be written as: P(x1,x2,x3|C) = P(x1|C)*P(x2|C)*P(x3|C), which given a parametric model each could be computed easily.

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No,seems this is not what I'm doing.C_i denotes Categories,while X_i denotes samples.So my question is how to classify different samples. –  user198729 Apr 12 '10 at 8:40
given what little details you're sharing, no wonder both @aduric and I misunderstood the question! –  Amro Apr 12 '10 at 17:15
Sorry man,now that you understand what I mean,do you have a solution ?Can I just use P( c_j | x_l ) * P( c_j | x_m ) * P( c_j | x_n ) to approximate P( c_j | x_l , x_m , x_n ) –  user198729 Apr 13 '10 at 14:07
Seems BNT can also be used to do this job by setting sizeNodes to [2 2 2 2]? –  user198729 Apr 13 '10 at 14:44
no that was a different thing. See my edit above.. –  Amro Apr 13 '10 at 15:30

Maybe this site can help? I'm assuming your trying to implement the Bayes rule in Matlab.

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What you want to do is not possible without further information or simplifying assumptions.

The conditional probability P(A|B,C) is not (completely/at all :) determined by P(A|B) and P(A|C).

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