bayesian prior and posterior study guide for es205 yu-chi ho jonathan t. lee nov. 24, 2000
TRANSCRIPT
Bayesian Prior and Posterior
Study Guide for ES205
Yu-Chi HoJonathan T. LeeNov. 24, 2000
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Outline Conditional Density Bayes Rule Conjugate Distribution Example Other Conjugate Distributions Application
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Conditional Density The conditional probability density of
w happening given x has occurred, assume px(x) 0:
N
xp
xwpxwp
X
XWXW
,| ,
|
xpxwpxwp xXWXW |, |, wpwxp wWX ||
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Bayes Rule Replace the joint probability density
function with the bottom equation from page 3:
nXX
WnWXX
nXXW
xxp
wpwxxp
xxwp
n
n
n
,,
|,,
,|
1,,
1|,,
1,,|
1
1
1
N
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Conjugate Distribution W: parameter of interest in some
system X: the independent and identical
observation on the system Since we know the model of the
system, the conditional density of X|W could be easily computed, e.g.,
wxp WX ||N
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Conjugate Distribution (cont.) If the prior distribution of W belong
to a family, for any size n and any values of the observations in the sample, the posterior distribution of W must also belong to the same family. This family is called a conjugate family of distributions.
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Example An urn of white and red balls with
unknown w being the fraction of the balls that are red.
Assume we can take n sample, X1, …, Xn, from the urn, with replacement, e.g, n i.i.d. samples.This is a Bernoulli distribution.
N
8
Example (cont.) Total number of red ball out of n
trials, Y = X1 + … + Xn, has the binomial distribution
Assume the prior dist. of w is beta distribution with parameters and
1 , , | 1, , | 1
n
n yyX X W np x x w w w
N
11 1 wwWpW
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Example (cont.) The posterior distribution of W is
which is also a beta distribution.
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1|,,
1,,|
1
|,,
,|
1
1
yny
WnWXX
nXXW
ww
wpwxxp
xxwp
n
n
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Example (cont.) Updating formula:
’ = + y Posterior (new) parameter =prior (old) parameter + # of red balls
’ = + (n – y) Posterior (new) parameter= prior (old) parameter + # of white balls
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Other Conjugate Distributions The observations forms a Poisson
distribution with an unknown value of the mean w.
The prior distribution of w is a gamma distribution with parameters and .
The posterior is also a gamma distribution with parameters and + n.
Updating formula:’ = + y’ = + n
n
i ix1
N
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Other Conjugate Distributions (cont.)
The observations forms a negative binomial distribution with a specified r value and an unknown value of the mean w.
The prior distribution of w is a beta distribution with parameters and .
The posterior is also a beta distribution with parameters + rn and .
Updating formula:’ = + rn’ = + y
N
n
i ix1
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Other Conjugate Distributions (cont.) The observations forms a normal
distribution with an unknown value of the mean w and specified precision r.
The prior distribution of w is a normal distribution with mean and precision .
The posterior is also a normal distribution with mean and precision + nr.
Updating formula:
N
nr
rxn
nr
rxn
nr
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Other Conjugate Distributions (cont.) The observations forms a normal
distribution with the specified mean m and unknown precision w.
The prior distribution of w is a gamma distribution with parameters and .
The posterior is also a gamma distribution with parameters and .
Updating formula:’ = + n/2’ = + ½
N
2
n
n
i i mx1
2
2
1
n
i i mx1
2
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Summary of the Conjugate Distributions
Observations Prior Posterior
Bernoulli Beta Beta
Poisson Gamma Gamma
Negative binominal
Beta Beta
Normal Normal Normal
Normal Gamma Gamma
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Application Estimate the state of the system
based on the observations: Kalman filter.
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References:
• DeGroot, M. H., Optimal Statistical Decisions, McGraw-Hill, 1970.
• Ho, Y.-C., Lecture Notes, Harvard University, 1997.• Larsen, R. J. and M. L. Marx, An Introduction to
Mathematical Statistics and Its Applications, Prentice Hall, 1986.