RBaskin@ahrq.gov
2003-Sep-23 15:07 UTC
[R] what does the sum of square of Gaussian RVs with differen t variance obey?
This is a relatively recent article that is somewhat accessible. Jensen, D. R., and Solomon, Herbert (1994), "Approximations to joint distributions of definite quadratic forms", Journal of the American Statistical Association, 89 , 480-486 It has references to previous work. I also have an old paper that is so old I can't tell what journal it came out of:( Grad, Arthur and Solomon, Herbert "Distribution of Quadratic Forms and Some Applications" probably published in 55 or 56 but I can't tell. The paper by Grad and Solomon uses the moment generating function to give the exact distribution and various approximations to produce a table for a sum of 2 or 3 variates. Usual disclaimers ... Bob -----Original Message----- From: Thomas Lumley [mailto:tlumley@u.washington.edu] Sent: Tuesday, September 23, 2003 10:07 AM To: Jean Sun Cc: r-help@stat.math.ethz.ch Subject: Re: [R] what does the sum of square of Gaussian RVs with different variance obey? On Tue, 23 Sep 2003, Jean Sun wrote:> >From basic statistics principle,we know,given several i.i.d Gaussian > >RVs with zero or nonzero mean,the sum of square of them is a central or > >noncentral Chi-distributed RV.However if these Gaussian RVs have > >different variances,what does the sum of square of them obey? >Nothing very useful. It's a mixture of chisquare(1) variables. One standard approach is to approximate it by a multiple of a chisquared distribution that has the correct mean and variance. -thomas ______________________________________________ R-help@stat.math.ethz.ch mailing list https://www.stat.math.ethz.ch/mailman/listinfo/r-help [[alternative HTML version deleted]]
Peter Dalgaard BSA
2003-Sep-24 11:46 UTC
[R] what does the sum of square of Gaussian RVs with differen t variance obey?
RBaskin at ahrq.gov writes:> This is a relatively recent article that is somewhat accessible. > Jensen, D. R., and Solomon, Herbert (1994), "Approximations to joint > distributions of definite quadratic forms", Journal of the American > Statistical Association, 89 , 480-486 > It has references to previous work. > > I also have an old paper that is so old I can't tell what journal it came > out of:( > Grad, Arthur and Solomon, Herbert "Distribution of Quadratic Forms and Some > Applications" probably published in 55 or 56 but I can't tell. The paper by > Grad and Solomon uses the moment generating function to give the exact > distribution and various approximations to produce a table for a sum of 2 or > 3 variates.Looks like this one (courtesy of JSTOR): Distribution of Quadratic Forms and Some Applications Arthur Grad; Herbert Solomon The Annals of Mathematical Statistics, Vol. 26, No. 3. (Sep., 1955), pp. 464-477. -- O__ ---- Peter Dalgaard Blegdamsvej 3 c/ /'_ --- Dept. of Biostatistics 2200 Cph. N (*) \(*) -- University of Copenhagen Denmark Ph: (+45) 35327918 ~~~~~~~~~~ - (p.dalgaard at biostat.ku.dk) FAX: (+45) 35327907