Is the Likelihood Function a Multivariate Gaussian Near a Minimum?

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kelly0303
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Hello! I am reading Data Reduction and Error Analysis by Bevington, 3rd Edition and in Chapter 8.1, Variation of ##\chi^2## Near a Minimum he states that for enough data the likelihood function becomes a Gaussian function of each parameter, with the mean being the value that minimizes the chi-square: $$P(a_j)=Ae^{-(a_j-a_j')^2/2\sigma_j^2}$$ where ##A## is a function of the other parameters, but not ##a_j##. Is this the general formula or is it a simplification where the correlation between the parameters is zero? From some examples later I guess this is just a particular case and I assume the most general formula would be a multivariate gaussian, but he doesn't explicitly state this anywhere. Can someone tell me what's the actual formula? Also, can someone point me towards a proof of this? Thank you!
 
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It is true if you only consider changes in aj and fix all other parameters to their value at the minimum, but not otherwise.
 
mfb said:
It is true if you only consider changes in aj and fix all other parameters to their value at the minimum, but not otherwise.
Thank you! Does it become a multivariate Gaussian, tho, away from the minimum (if there are correlations)? Or does this formula apply only at the minimum value?