Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(lu) #1

31.3 ESTIMATORS AND SAMPLING DISTRIBUTIONS


and, on differentiating twice with respect toμ, we find


∂^2 lnP
∂μ^2

=−


N


σ^2

.


This is independent of thexiand so its expectation value is also equal to−N/σ^2 .Withb
set equal to zero in (31.17), Fisher’s inequality thus states that, foranyunbiased estimator
μˆof the population mean,


V[μˆ]≥

σ^2
N

.


SinceV[ ̄x]=σ^2 /N, the sample mean ̄xis a minimum-variance estimator ofμ.


31.3.2 Fisher’s inequality

As mentioned above, Fisher’s inequality provides a lower limit on the variance of


anyestimatoraˆof the quantitya;itreads


V[aˆ]≥

(
1+

∂b
∂a

) 2 /
E

[

∂^2 lnP
∂a^2

]
, (31.18)

wherePstands for the populationP(x|a)andbis the bias of the estimator.


We now present a proof of this inequality. Since the derivation is somewhat


complicated, and many of the details are unimportant, this section can be omitted


on a first reading. Nevertheless, some aspects of the proof will be useful when


the efficiency of maximum-likelihood estimators is discussed in section 31.5.


Prove Fisher’s inequality (31.18).

The normalisation ofP(x|a)isgivenby

P(x|a)dNx=1, (31.19)


wheredNx=dx 1 dx 2 ···dxNand the integral extends over all the allowed values of the
sample itemsxi. Differentiating (31.19) with respect to the parametera,weobtain

∂P
∂a


dNx=


∂lnP
∂a

PdNx=0. (31.20)

We note that the second integral is simply the expectation value of∂lnP/∂a,wherethe
average is taken over all possible samplesxi,i=1, 2 ,...,N.Further,byequatingthetwo
expressions for∂E[aˆ]/∂aobtained by differentiating (31.15) and (31.14) with respect toa
we obtain, dropping the functional dependencies, a second relationship,


1+

∂b
∂a

=




∂P


∂a

dNx=



∂lnP
∂a

PdNx. (31.21)

Now, multiplying (31.20) byα(a), whereα(a)isanyfunction ofa, and subtracting the
result from (31.21), we obtain

[aˆ−α(a)]


∂lnP
∂a

PdNx=1+

∂b
∂a

.


At this point we must invoke the Schwarz inequality proved in subsection 8.1.3. The proof

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