[R] help computing a covariance

Spencer Graves spencer.graves at pdf.com
Fri Jul 2 19:23:54 CEST 2004 

Another thought:  Do you really need A to be an arbitrary k-vector? 
Might it have other structure that you can use?  spencer graves
	
#################
      Have you tried simulating several special cases?  The right set of
simulations should suggest an answer, which might then lead you to a
proof.

      hope this helps.  spencer graves

Eugene Salinas (R) wrote:

> Thanks. This is sort of what I have been trying to do... but I keep 
> ending up with products of non-independent chi-squares where I am sort 
> of getting stuck. I knew this Theorem just never knew it was called 
> Cochran's Thm. Btw, do you know of a good book that deals with 
> multivariate statistics using vector notation etc. All the books I 
> have seem to be focused on scalar random variables and they don't even 
> mention it.)
>
> thanks, eugene.
>
>
> Spencer Graves wrote:
>
>>      Have you considered Cochran's theorem?  (A Google search just 
>> produce 387 hits for this, the second of which 
>> "http://mcs.une.edu.au/~stat354/notes/node37.html" provided details 
>> that might help.)  By construction, P is n x n, idempotent of rank k, 
>> so y'Py is chi-square(k).  Also, xA is an n-vector in the (rank k) 
>> column space of x;  indeed, PxA = [x*inv(x'x)*x]xA = xA.  I can't see 
>> the details now but I believe you can write (A'x'y)^2 = y'xAA'x'y as 
>> a weighted sum of k independent chi-squares each with one degree of 
>> freedom (since x and P have rank k), and then get what you want from 
>> the sum of the weights.  Then check your result using Monte Carlo.
>>      hope this helps.  spencer graves
>>
>> Eugene Salinas (R) wrote:
>>
>>> Hi everyone,
>>>
>>> (This is related to my posting on chi-squared from a day ago. I have 
>>> tried simulating this but I am still unable to calculate it 
>>> analytically.)
>>>
>>> Let y be an n times 1 vector of random normal variables mean zero 
>>> variance 1 and x be an n times k vector of random normal variables 
>>> mean zero variance 1. x and y are independent.
>>>
>>> Then P is the projection matrix  P=x*inv(x'*x)*x'
>>>
>>> I need to figure out the covariance
>>>
>>> Cov ( y'*P*y , (A'*x'*y)^2 ) where A is a constant of dimension k 
>>> times 1.
>>>
>>> thanks, eugene.
>>>
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>>
>>
>>
>>
>>
>
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