Estimation theory




Branch of statistics to estimate models based on measured data



Estimation theory is a branch of statistics that deals with estimating the values of parameters based on measured empirical data that has a random component. The parameters describe an underlying physical setting in such a way that their value affects the distribution of the measured data. An estimator attempts to approximate the unknown parameters using the measurements. When the data consist of multiple variables and one is estimating the relationship between them, estimation is known as regression analysis.


In estimation theory, two approaches are generally considered.[1]



  • The probabilistic approach (described in this article) assumes that the measured data is random with probability distribution dependent on the parameters of interest

  • The set-membership approach assumes that the measured data vector belongs to a set which depends on the parameter vector.




Contents






  • 1 Examples


  • 2 Basics


  • 3 Estimators


  • 4 Examples


    • 4.1 Unknown constant in additive white Gaussian noise


      • 4.1.1 Maximum likelihood


      • 4.1.2 Cramér–Rao lower bound




    • 4.2 Maximum of a uniform distribution




  • 5 Applications


  • 6 See also


  • 7 Notes


  • 8 References





Examples


For example, it is desired to estimate the proportion of a population of voters who will vote for a particular candidate. That proportion is the parameter sought; the estimate is based on a small random sample of voters. Alternatively, it is desired to estimate the probability of a voter voting for a particular candidate, based on some demographic features, such as age; this estimates a relationship, and thus is a regression question.


Or, for example, in radar the aim is to find the range of objects (airplanes, boats, etc.) by analyzing the two-way transit timing of received echoes of transmitted pulses. Since the reflected pulses are unavoidably embedded in electrical noise, their measured values are randomly distributed, so that the transit time must be estimated.


As another example, in electrical communication theory, the measurements which contain information regarding the parameters of interest are often associated with a noisy signal.



Basics


For a given model, several statistical "ingredients" are needed so the estimator can be implemented. The first is a statistical sample – a set of data points taken from a random vector (RV) of size N. Put into a vector,


x=[x[0]x[1]⋮x[N−1]].{displaystyle mathbf {x} ={begin{bmatrix}x[0]\x[1]\vdots \x[N-1]end{bmatrix}}.}mathbf {x} ={begin{bmatrix}x[0]\x[1]\vdots \x[N-1]end{bmatrix}}.

Secondly, there are M parameters


θ=[θ2⋮θM],{displaystyle mathbf {theta } ={begin{bmatrix}theta _{1}\theta _{2}\vdots \theta _{M}end{bmatrix}},}mathbf {theta } ={begin{bmatrix}theta _{1}\theta _{2}\vdots \theta _{M}end{bmatrix}},

whose values are to be estimated. Third, the continuous probability density function (pdf) or its discrete counterpart, the probability mass function (pmf), of the underlying distribution that generated the data must be stated conditional on the values of the parameters:


p(x|θ).{displaystyle p(mathbf {x} |mathbf {theta } ).,}p(mathbf {x} |mathbf {theta } ).,

It is also possible for the parameters themselves to have a probability distribution (e.g., Bayesian statistics). It is then necessary to define the Bayesian probability


π).{displaystyle pi (mathbf {theta } ).,}pi (mathbf {theta } ).,

After the model is formed, the goal is to estimate the parameters, with the estimates commonly denoted θ^{displaystyle {hat {mathbf {theta } }}}{hat {mathbf {theta } }}, where the "hat" indicates the estimate.


One common estimator is the minimum mean squared error (MMSE) estimator, which utilizes the error between the estimated parameters and the actual value of the parameters


e=θ^θ{displaystyle mathbf {e} ={hat {mathbf {theta } }}-mathbf {theta } }mathbf {e} ={hat {mathbf {theta } }}-mathbf {theta }

as the basis for optimality. This error term is then squared and the expected value of this squared value is minimized for the MMSE estimator.



Estimators



Commonly used estimators (estimation methods) and topics related to them include:




  • Maximum likelihood estimators

  • Bayes estimators


  • Method of moments estimators

  • Cramér–Rao bound

  • Least squares


  • Minimum mean squared error (MMSE), also known as Bayes least squared error (BLSE)


  • Maximum a posteriori (MAP)


  • Minimum variance unbiased estimator (MVUE)

  • Nonlinear system identification


  • Best linear unbiased estimator (BLUE)

  • Unbiased estimators — see estimator bias.

  • Particle filter


  • Markov chain Monte Carlo (MCMC)


  • Kalman filter, and its various derivatives

  • Wiener filter



Examples



Unknown constant in additive white Gaussian noise


Consider a received discrete signal, x[n]{displaystyle x[n]}x[n], of N{displaystyle N}N independent samples that consists of an unknown constant A{displaystyle A}A with additive white Gaussian noise (AWGN) w[n]{displaystyle w[n]}w[n] with known variance σ2{displaystyle sigma ^{2}}sigma ^{2} (i.e., N(0,σ2){displaystyle {mathcal {N}}(0,sigma ^{2})}{mathcal {N}}(0,sigma ^{2})).
Since the variance is known then the only unknown parameter is A{displaystyle A}A.


The model for the signal is then


x[n]=A+w[n]n=0,1,…,N−1{displaystyle x[n]=A+w[n]quad n=0,1,dots ,N-1}x[n]=A+w[n]quad n=0,1,dots ,N-1

Two possible (of many) estimators for the parameter A{displaystyle A}A are:



  • A^1=x[0]{displaystyle {hat {A}}_{1}=x[0]}{hat {A}}_{1}=x[0]


  • A^2=1N∑n=0N−1x[n]{displaystyle {hat {A}}_{2}={frac {1}{N}}sum _{n=0}^{N-1}x[n]}{hat {A}}_{2}={frac {1}{N}}sum _{n=0}^{N-1}x[n] which is the sample mean


Both of these estimators have a mean of A{displaystyle A}A, which can be shown through taking the expected value of each estimator


E[A^1]=E[x[0]]=A{displaystyle mathrm {E} left[{hat {A}}_{1}right]=mathrm {E} left[x[0]right]=A}mathrm {E} left[{hat {A}}_{1}right]=mathrm {E} left[x[0]right]=A

and


E[A^2]=E[1N∑n=0N−1x[n]]=1N[∑n=0N−1E[x[n]]]=1N[NA]=A{displaystyle mathrm {E} left[{hat {A}}_{2}right]=mathrm {E} left[{frac {1}{N}}sum _{n=0}^{N-1}x[n]right]={frac {1}{N}}left[sum _{n=0}^{N-1}mathrm {E} left[x[n]right]right]={frac {1}{N}}left[NAright]=A}mathrm {E} left[{hat {A}}_{2}right]=mathrm {E} left[{frac {1}{N}}sum _{n=0}^{N-1}x[n]right]={frac {1}{N}}left[sum _{n=0}^{N-1}mathrm {E} left[x[n]right]right]={frac {1}{N}}left[NAright]=A

At this point, these two estimators would appear to perform the same.
However, the difference between them becomes apparent when comparing the variances.


var(A^1)=var(x[0])=σ2{displaystyle mathrm {var} left({hat {A}}_{1}right)=mathrm {var} left(x[0]right)=sigma ^{2}}mathrm {var} left({hat {A}}_{1}right)=mathrm {var} left(x[0]right)=sigma ^{2}

and


var(A^2)=var(1N∑n=0N−1x[n])=independence1N2[∑n=0N−1var(x[n])]=1N2[Nσ2]=σ2N{displaystyle mathrm {var} left({hat {A}}_{2}right)=mathrm {var} left({frac {1}{N}}sum _{n=0}^{N-1}x[n]right){overset {text{independence}}{=}}{frac {1}{N^{2}}}left[sum _{n=0}^{N-1}mathrm {var} (x[n])right]={frac {1}{N^{2}}}left[Nsigma ^{2}right]={frac {sigma ^{2}}{N}}}mathrm {var} left({hat {A}}_{2}right)=mathrm {var} left({frac {1}{N}}sum _{n=0}^{N-1}x[n]right){overset {text{independence}}{=}}{frac {1}{N^{2}}}left[sum _{n=0}^{N-1}mathrm {var} (x[n])right]={frac {1}{N^{2}}}left[Nsigma ^{2}right]={frac {sigma ^{2}}{N}}

It would seem that the sample mean is a better estimator since its variance is lower for every N > 1.



Maximum likelihood



Continuing the example using the maximum likelihood estimator, the probability density function (pdf) of the noise for one sample w[n]{displaystyle w[n]}w[n] is


p(w[n])=1σexp⁡(−12σ2w[n]2){displaystyle p(w[n])={frac {1}{sigma {sqrt {2pi }}}}exp left(-{frac {1}{2sigma ^{2}}}w[n]^{2}right)}p(w[n])={frac {1}{sigma {sqrt {2pi }}}}exp left(-{frac {1}{2sigma ^{2}}}w[n]^{2}right)

and the probability of x[n]{displaystyle x[n]}x[n] becomes (x[n]{displaystyle x[n]}x[n] can be thought of a N(A,σ2){displaystyle {mathcal {N}}(A,sigma ^{2})}{mathcal {N}}(A,sigma ^{2}))


p(x[n];A)=1σexp⁡(−12σ2(x[n]−A)2){displaystyle p(x[n];A)={frac {1}{sigma {sqrt {2pi }}}}exp left(-{frac {1}{2sigma ^{2}}}(x[n]-A)^{2}right)}p(x[n];A)={frac {1}{sigma {sqrt {2pi }}}}exp left(-{frac {1}{2sigma ^{2}}}(x[n]-A)^{2}right)

By independence, the probability of x{displaystyle mathbf {x} }mathbf {x} becomes


p(x;A)=∏n=0N−1p(x[n];A)=1(σ)Nexp⁡(−12σ2∑n=0N−1(x[n]−A)2){displaystyle p(mathbf {x} ;A)=prod _{n=0}^{N-1}p(x[n];A)={frac {1}{left(sigma {sqrt {2pi }}right)^{N}}}exp left(-{frac {1}{2sigma ^{2}}}sum _{n=0}^{N-1}(x[n]-A)^{2}right)}p(mathbf {x} ;A)=prod _{n=0}^{N-1}p(x[n];A)={frac {1}{left(sigma {sqrt {2pi }}right)^{N}}}exp left(-{frac {1}{2sigma ^{2}}}sum _{n=0}^{N-1}(x[n]-A)^{2}right)

Taking the natural logarithm of the pdf


ln⁡p(x;A)=−Nln⁡)−12σ2∑n=0N−1(x[n]−A)2{displaystyle ln p(mathbf {x} ;A)=-Nln left(sigma {sqrt {2pi }}right)-{frac {1}{2sigma ^{2}}}sum _{n=0}^{N-1}(x[n]-A)^{2}}ln p(mathbf {x} ;A)=-Nln left(sigma {sqrt {2pi }}right)-{frac {1}{2sigma ^{2}}}sum _{n=0}^{N-1}(x[n]-A)^{2}

and the maximum likelihood estimator is


A^=arg⁡maxln⁡p(x;A){displaystyle {hat {A}}=arg max ln p(mathbf {x} ;A)}{hat {A}}=arg max ln p(mathbf {x} ;A)

Taking the first derivative of the log-likelihood function


Aln⁡p(x;A)=1σ2[∑n=0N−1(x[n]−A)]=1σ2[∑n=0N−1x[n]−NA]{displaystyle {frac {partial }{partial A}}ln p(mathbf {x} ;A)={frac {1}{sigma ^{2}}}left[sum _{n=0}^{N-1}(x[n]-A)right]={frac {1}{sigma ^{2}}}left[sum _{n=0}^{N-1}x[n]-NAright]}{frac {partial }{partial A}}ln p(mathbf {x} ;A)={frac {1}{sigma ^{2}}}left[sum _{n=0}^{N-1}(x[n]-A)right]={frac {1}{sigma ^{2}}}left[sum _{n=0}^{N-1}x[n]-NAright]

and setting it to zero


0=1σ2[∑n=0N−1x[n]−NA]=∑n=0N−1x[n]−NA{displaystyle 0={frac {1}{sigma ^{2}}}left[sum _{n=0}^{N-1}x[n]-NAright]=sum _{n=0}^{N-1}x[n]-NA}0={frac {1}{sigma ^{2}}}left[sum _{n=0}^{N-1}x[n]-NAright]=sum _{n=0}^{N-1}x[n]-NA

This results in the maximum likelihood estimator


A^=1N∑n=0N−1x[n]{displaystyle {hat {A}}={frac {1}{N}}sum _{n=0}^{N-1}x[n]}{hat {A}}={frac {1}{N}}sum _{n=0}^{N-1}x[n]

which is simply the sample mean.
From this example, it was found that the sample mean is the maximum likelihood estimator for N{displaystyle N}N samples of a fixed, unknown parameter corrupted by AWGN.



Cramér–Rao lower bound



To find the Cramér–Rao lower bound (CRLB) of the sample mean estimator, it is first necessary to find the Fisher information number


I(A)=E([∂Aln⁡p(x;A)]2)=−E[∂2∂A2ln⁡p(x;A)]{displaystyle {mathcal {I}}(A)=mathrm {E} left(left[{frac {partial }{partial A}}ln p(mathbf {x} ;A)right]^{2}right)=-mathrm {E} left[{frac {partial ^{2}}{partial A^{2}}}ln p(mathbf {x} ;A)right]}{mathcal {I}}(A)=mathrm {E} left(left[{frac {partial }{partial A}}ln p(mathbf {x} ;A)right]^{2}right)=-mathrm {E} left[{frac {partial ^{2}}{partial A^{2}}}ln p(mathbf {x} ;A)right]

and copying from above


Aln⁡p(x;A)=1σ2[∑n=0N−1x[n]−NA]{displaystyle {frac {partial }{partial A}}ln p(mathbf {x} ;A)={frac {1}{sigma ^{2}}}left[sum _{n=0}^{N-1}x[n]-NAright]}{frac {partial }{partial A}}ln p(mathbf {x} ;A)={frac {1}{sigma ^{2}}}left[sum _{n=0}^{N-1}x[n]-NAright]

Taking the second derivative


2∂A2ln⁡p(x;A)=1σ2(−N)=−2{displaystyle {frac {partial ^{2}}{partial A^{2}}}ln p(mathbf {x} ;A)={frac {1}{sigma ^{2}}}(-N)={frac {-N}{sigma ^{2}}}}{frac {partial ^{2}}{partial A^{2}}}ln p(mathbf {x} ;A)={frac {1}{sigma ^{2}}}(-N)={frac {-N}{sigma ^{2}}}

and finding the negative expected value is trivial since it is now a deterministic constant
E[∂2∂A2ln⁡p(x;A)]=Nσ2{displaystyle -mathrm {E} left[{frac {partial ^{2}}{partial A^{2}}}ln p(mathbf {x} ;A)right]={frac {N}{sigma ^{2}}}}-mathrm {E} left[{frac {partial ^{2}}{partial A^{2}}}ln p(mathbf {x} ;A)right]={frac {N}{sigma ^{2}}}


Finally, putting the Fisher information into


var(A^)≥1I{displaystyle mathrm {var} left({hat {A}}right)geq {frac {1}{mathcal {I}}}}mathrm {var} left({hat {A}}right)geq {frac {1}{mathcal {I}}}

results in


var(A^)≥σ2N{displaystyle mathrm {var} left({hat {A}}right)geq {frac {sigma ^{2}}{N}}}mathrm {var} left({hat {A}}right)geq {frac {sigma ^{2}}{N}}

Comparing this to the variance of the sample mean (determined previously) shows that the sample mean is equal to the Cramér–Rao lower bound for all values of N{displaystyle N}N and A{displaystyle A}A.
In other words, the sample mean is the (necessarily unique) efficient estimator, and thus also the minimum variance unbiased estimator (MVUE), in addition to being the maximum likelihood estimator.



Maximum of a uniform distribution



One of the simplest non-trivial examples of estimation is the estimation of the maximum of a uniform distribution. It is used as a hands-on classroom exercise and to illustrate basic principles of estimation theory. Further, in the case of estimation based on a single sample, it demonstrates philosophical issues and possible misunderstandings in the use of maximum likelihood estimators and likelihood functions.


Given a discrete uniform distribution 1,2,…,N{displaystyle 1,2,dots ,N}1,2,dots ,N with unknown maximum, the UMVU estimator for the maximum is given by


k+1km−1=m+mk−1{displaystyle {frac {k+1}{k}}m-1=m+{frac {m}{k}}-1}{frac {k+1}{k}}m-1=m+{frac {m}{k}}-1

where m is the sample maximum and k is the sample size, sampling without replacement.[2][3] This problem is commonly known as the German tank problem, due to application of maximum estimation to estimates of German tank production during World War II.


The formula may be understood intuitively as;


"The sample maximum plus the average gap between observations in the sample",

the gap being added to compensate for the negative bias of the sample maximum as an estimator for the population maximum.[note 1]


This has a variance of[2]


1k(N−k)(N+1)(k+2)≈N2k2 for small samples k≪N{displaystyle {frac {1}{k}}{frac {(N-k)(N+1)}{(k+2)}}approx {frac {N^{2}}{k^{2}}}{text{ for small samples }}kll N}{frac {1}{k}}{frac {(N-k)(N+1)}{(k+2)}}approx {frac {N^{2}}{k^{2}}}{text{ for small samples }}kll N

so a standard deviation of approximately N/k{displaystyle N/k}N/k, the (population) average size of a gap between samples; compare mk{displaystyle {frac {m}{k}}}{frac {m}{k}} above. This can be seen as a very simple case of maximum spacing estimation.


The sample maximum is the maximum likelihood estimator for the population maximum, but, as discussed above, it is biased.



Applications


Numerous fields require the use of estimation theory.
Some of these fields include (but are by no means limited to):



  • Interpretation of scientific experiments

  • Signal processing

  • Clinical trials

  • Opinion polls

  • Quality control

  • Telecommunications

  • Project management

  • Software engineering


  • Control theory (in particular Adaptive control)

  • Network intrusion detection system

  • Orbit determination


Measured data are likely to be subject to noise or uncertainty and it is through statistical probability that optimal solutions are sought to extract as much information from the data as possible.



See also


  • Category:Estimation theory




  • Best linear unbiased estimator (BLUE)

  • Chebyshev center

  • Completeness (statistics)

  • Cramér–Rao bound

  • Detection theory

  • Efficiency (statistics)


  • Estimator, Estimator bias


  • Expectation-maximization algorithm (EM algorithm)

  • Fermi problem

  • Grey box model

  • Information theory

  • Kalman filter

  • Least-squares spectral analysis


  • Markov chain Monte Carlo (MCMC)

  • Matched filter


  • Maximum a posteriori (MAP)

  • Maximum likelihood

  • Maximum entropy spectral estimation


  • Method of moments, generalized method of moments


  • Minimum mean squared error (MMSE)


  • Minimum variance unbiased estimator (MVUE)

  • Nonlinear system identification

  • Nuisance parameter

  • Parametric equation

  • Pareto principle

  • Particle filter

  • Rao–Blackwell theorem

  • Rule of three (statistics)


  • Spectral density, Spectral density estimation

  • Statistical signal processing

  • Sufficiency (statistics)

  • Wiener filter




Notes





  1. ^ The sample maximum is never more than the population maximum, but can be less, hence it is a biased estimator: it will tend to underestimate the population maximum.




References





  1. ^
    Walter, E.; Pronzato, L. (1997). Identification of Parametric Models from Experimental Data. London, UK: Springer-Verlag..mw-parser-output cite.citation{font-style:inherit}.mw-parser-output .citation q{quotes:"""""""'""'"}.mw-parser-output .citation .cs1-lock-free a{background:url("//upload.wikimedia.org/wikipedia/commons/thumb/6/65/Lock-green.svg/9px-Lock-green.svg.png")no-repeat;background-position:right .1em center}.mw-parser-output .citation .cs1-lock-limited a,.mw-parser-output .citation .cs1-lock-registration a{background:url("//upload.wikimedia.org/wikipedia/commons/thumb/d/d6/Lock-gray-alt-2.svg/9px-Lock-gray-alt-2.svg.png")no-repeat;background-position:right .1em center}.mw-parser-output .citation .cs1-lock-subscription a{background:url("//upload.wikimedia.org/wikipedia/commons/thumb/a/aa/Lock-red-alt-2.svg/9px-Lock-red-alt-2.svg.png")no-repeat;background-position:right .1em center}.mw-parser-output .cs1-subscription,.mw-parser-output .cs1-registration{color:#555}.mw-parser-output .cs1-subscription span,.mw-parser-output .cs1-registration span{border-bottom:1px dotted;cursor:help}.mw-parser-output .cs1-ws-icon a{background:url("//upload.wikimedia.org/wikipedia/commons/thumb/4/4c/Wikisource-logo.svg/12px-Wikisource-logo.svg.png")no-repeat;background-position:right .1em center}.mw-parser-output code.cs1-code{color:inherit;background:inherit;border:inherit;padding:inherit}.mw-parser-output .cs1-hidden-error{display:none;font-size:100%}.mw-parser-output .cs1-visible-error{font-size:100%}.mw-parser-output .cs1-maint{display:none;color:#33aa33;margin-left:0.3em}.mw-parser-output .cs1-subscription,.mw-parser-output .cs1-registration,.mw-parser-output .cs1-format{font-size:95%}.mw-parser-output .cs1-kern-left,.mw-parser-output .cs1-kern-wl-left{padding-left:0.2em}.mw-parser-output .cs1-kern-right,.mw-parser-output .cs1-kern-wl-right{padding-right:0.2em}



  2. ^ ab Johnson, Roger (1994), "Estimating the Size of a Population", Teaching Statistics, 16 (2 (Summer)): 50, doi:10.1111/j.1467-9639.1994.tb00688.x External link in |journal= (help)


  3. ^ Johnson, Roger (2006), "Estimating the Size of a Population", Getting the Best from Teaching Statistics, archived from the original (PDF) on November 20, 2008



Sources



  • Theory of Point Estimation by E.L. Lehmann and G. Casella. (
    ISBN 0387985026)


  • Systems Cost Engineering by Dale Shermon. (
    ISBN 978-0-566-08861-2)


  • Mathematical Statistics and Data Analysis by John Rice. (
    ISBN 0-534-209343)


  • Fundamentals of Statistical Signal Processing: Estimation Theory by Steven M. Kay (
    ISBN 0-13-345711-7)


  • An Introduction to Signal Detection and Estimation by H. Vincent Poor (
    ISBN 0-387-94173-8)


  • Detection, Estimation, and Modulation Theory, Part 1 by Harry L. Van Trees (
    ISBN 0-471-09517-6; website)


  • Optimal State Estimation: Kalman, H-infinity, and Nonlinear Approaches by Dan Simon website


  • Ali H. Sayed, Adaptive Filters, Wiley, NJ, 2008,
    ISBN 978-0-470-25388-5.


  • Ali H. Sayed, Fundamentals of Adaptive Filtering, Wiley, NJ, 2003,
    ISBN 0-471-46126-1.


  • Thomas Kailath, Ali H. Sayed, and Babak Hassibi, Linear Estimation, Prentice-Hall, NJ, 2000,
    ISBN 978-0-13-022464-4.


  • Babak Hassibi, Ali H. Sayed, and Thomas Kailath, Indefinite Quadratic Estimation and Control: A Unified Approach to H2 and Hoo Theories, Society for Industrial & Applied Mathematics (SIAM), PA, 1999,
    ISBN 978-0-89871-411-1.

  • V.G.Voinov, M.S.Nikulin, "Unbiased estimators and their applications. Vol.1: Univariate case", Kluwer Academic Publishers, 1993,
    ISBN 0-7923-2382-3.

  • V.G.Voinov, M.S.Nikulin, "Unbiased estimators and their applications. Vol.2: Multivariate case", Kluwer Academic Publishers, 1996,
    ISBN 0-7923-3939-8.









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