Efficient Estimator
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statistics Statistics (from German language, German: ''wikt:Statistik#German, Statistik'', "description of a State (polity), state, a country") is the discipline that concerns the collection, organization, analysis, interpretation, and presentation of ...
, efficiency is a measure of quality of an estimator, of an experimental design, or of a hypothesis testing procedure. Essentially, a more efficient estimator, needs fewer input data or observations than a less efficient one to achieve the Cramér–Rao bound. An ''efficient estimator'' is characterized by having the smallest possible variance, indicating that there is a small deviance between the estimated value and the "true" value in the L2 norm sense. The relative efficiency of two procedures is the ratio of their efficiencies, although often this concept is used where the comparison is made between a given procedure and a notional "best possible" procedure. The efficiencies and the relative efficiency of two procedures theoretically depend on the sample size available for the given procedure, but it is often possible to use the asymptotic relative efficiency (defined as the limit of the relative efficiencies as the sample size grows) as the principal comparison measure.


Estimators

The efficiency of an unbiased estimator, ''T'', of a parameter ''θ'' is defined as : e(T) = \frac where \mathcal(\theta) is the Fisher information of the sample. Thus ''e''(''T'') is the minimum possible variance for an unbiased estimator divided by its actual variance. The Cramér–Rao bound can be used to prove that ''e''(''T'') ≤ 1.


Efficient estimators

An efficient estimator is an estimator that estimates the quantity of interest in some “best possible” manner. The notion of “best possible” relies upon the choice of a particular
loss function In mathematical optimization and decision theory, a loss function or cost function (sometimes also called an error function) is a function that maps an event or values of one or more variables onto a real number intuitively representing some "cost ...
— the function which quantifies the relative degree of undesirability of estimation errors of different magnitudes. The most common choice of the loss function is
quadratic In mathematics, the term quadratic describes something that pertains to squares, to the operation of squaring, to terms of the second degree, or equations or formulas that involve such terms. ''Quadratus'' is Latin for ''square''. Mathematics ...
, resulting in the mean squared error criterion of optimality. In general, the spread of an estimator around the parameter θ is a measure of estimator efficiency and performance. This performance can be calculated by finding the mean squared error. More formally, let ''T'' be an estimator for the parameter ''θ''. The mean squared error of ''T'' is the value \operatorname(T)=E T-\theta)^2/math>, which can be decomposed as a sum of its variance and bias: : \begin \operatorname(T) & = \operatorname E T-\theta)^2\operatorname E T-\operatorname E[T\operatorname E[T">.html" ;"title="T-\operatorname E[T">T-\operatorname E[T\operatorname E[T\theta)^2] \\[5pt] & =\operatorname E[(T-\operatorname E[T])^2]+2E[T-E[T(\operatorname E \theta)+(\operatorname E \theta)^2 \\[5pt] & =\operatorname(T)+(\operatorname E \theta)^2 \end An estimator ''T''1 performs better than an estimator ''T''2 if \operatorname(T_1) < \operatorname(T_2). For a more specific case, if ''T''1 and ''T2 ''are two unbiased estimators for the same parameter θ, then the variance can be compared to determine performance. In this case, ''T''2 is ''more efficient'' than ''T''1 if the variance of ''T''2 is ''smaller'' than the variance of ''T''1, i.e. \operatorname(T_1)>\operatorname(T_2) for all values of ''θ''. This relationship can be determined by simplifying the more general case above for mean squared error; since the expected value of an unbiased estimator is equal to the parameter value, \operatorname E \theta. Therefore, for an unbiased estimator, \operatorname(T)=\operatorname(T), as the (\operatorname E \theta)^2 term drops out for being equal to 0. If an unbiased estimator of a parameter ''θ'' attains e(T) = 1 for all values of the parameter, then the estimator is called efficient. Equivalently, the estimator achieves equality in the Cramér–Rao inequality for all ''θ''. The Cramér–Rao lower bound is a lower bound of the variance of an unbiased estimator, representing the "best" an unbiased estimator can be. An efficient estimator is also the minimum variance unbiased estimator (MVUE). This is because an efficient estimator maintains equality on the Cramér–Rao inequality for all parameter values, which means it attains the minimum variance for all parameters (the definition of the MVUE). The MVUE estimator, even if it exists, is not necessarily efficient, because "minimum" does not mean equality holds on the Cramér–Rao inequality. Thus an efficient estimator need not exist, but if it does, it is the MVUE.


Finite-sample efficiency

Suppose is a
parametric model In statistics, a parametric model or parametric family or finite-dimensional model is a particular class of statistical models. Specifically, a parametric model is a family of probability distributions that has a finite number of parameters. Def ...
and are the data sampled from this model. Let be an estimator for the parameter ''θ''. If this estimator is unbiased (that is, ), then the Cramér–Rao inequality states the variance of this estimator is bounded from below: : \operatorname ,T\, \geq\ \mathcal_\theta^, where \scriptstyle\mathcal_\theta is the Fisher information matrix of the model at point ''θ''. Generally, the variance measures the degree of dispersion of a random variable around its mean. Thus estimators with small variances are more concentrated, they estimate the parameters more precisely. We say that the estimator is a finite-sample efficient estimator (in the class of unbiased estimators) if it reaches the lower bound in the Cramér–Rao inequality above, for all . Efficient estimators are always minimum variance unbiased estimators. However the converse is false: There exist point-estimation problems for which the minimum-variance mean-unbiased estimator is inefficient. Historically, finite-sample efficiency was an early optimality criterion. However this criterion has some limitations: * Finite-sample efficient estimators are extremely rare. In fact, it was proved that efficient estimation is possible only in an exponential family, and only for the natural parameters of that family. * This notion of efficiency is sometimes restricted to the class of unbiased estimators. (Often it isn't.) Since there are no good theoretical reasons to require that estimators are unbiased, this restriction is inconvenient. In fact, if we use mean squared error as a selection criterion, many biased estimators will slightly outperform the “best” unbiased ones. For example, in multivariate statistics for dimension three or more, the mean-unbiased estimator, sample mean, is inadmissible: Regardless of the outcome, its performance is worse than for example the James–Stein estimator. * Finite-sample efficiency is based on the variance, as a criterion according to which the estimators are judged. A more general approach is to use
loss function In mathematical optimization and decision theory, a loss function or cost function (sometimes also called an error function) is a function that maps an event or values of one or more variables onto a real number intuitively representing some "cost ...
s other than quadratic ones, in which case the finite-sample efficiency can no longer be formulated. As an example, among the models encountered in practice, efficient estimators exist for: the mean ''μ'' of the normal distribution (but not the variance ''σ''2), parameter ''λ'' of the Poisson distribution, the probability ''p'' in the binomial or multinomial distribution. Consider the model of a normal distribution with unknown mean but known variance: The data consists of ''n'' independent and identically distributed observations from this model: . We estimate the parameter ''θ'' using the sample mean of all observations: : T(X) = \frac1n \sum_^n x_i\ . This estimator has mean ''θ'' and variance of , which is equal to the reciprocal of the Fisher information from the sample. Thus, the sample mean is a finite-sample efficient estimator for the mean of the normal distribution.


Asymptotic efficiency

Asymptotic efficiency requires
Consistency (statistics) In statistics, consistency of procedures, such as computing confidence intervals or conducting hypothesis tests, is a desired property of their behaviour as the number of items in the data set to which they are applied increases indefinitely. In par ...
, asymptotic normally distribution of estimator, and asymptotic variance-covariance matrix no worse than any other estimator.


Example: Median

Consider a sample of size N drawn from a normal distribution of mean \mu and unit variance, i.e., X_n \sim \mathcal(\mu, 1). The sample mean, \overline, of the sample X_1, X_2, \ldots, X_N, defined as : \overline = \frac \sum_^ X_n \sim \mathcal\left(\mu, \frac\right). The variance of the mean, 1/''N'' (the square of the standard error) is equal to the reciprocal of the Fisher information from the sample and thus, by the Cramér–Rao inequality, the sample mean is efficient in the sense that its efficiency is unity (100%). Now consider the sample median, \widetilde. This is an unbiased and consistent estimator for \mu. For large N the sample median is approximately normally distributed with mean \mu and variance /, :\widetilde \sim \mathcal \left(\mu, \frac \pi \right). The efficiency of the median for large N is thus : e\left(\widetilde\right) = \left(\frac 1 N\right) \left(\frac \pi \right)^ = 2/\pi \approx 0.64. In other words, the relative variance of the median will be \pi/2 \approx 1.57, or 57% greater than the variance of the mean – the standard error of the median will be 25% greater than that of the mean. Note that this is the
asymptotic In analytic geometry, an asymptote () of a curve is a line such that the distance between the curve and the line approaches zero as one or both of the ''x'' or ''y'' coordinates tends to infinity. In projective geometry and related contexts, ...
efficiency — that is, the efficiency in the limit as sample size N tends to infinity. For finite values of N, the efficiency is higher than this (for example, a sample size of 3 gives an efficiency of about 74%). The sample mean is thus more efficient than the sample median in this example. However, there may be measures by which the median performs better. For example, the median is far more robust to
outlier In statistics, an outlier is a data point that differs significantly from other observations. An outlier may be due to a variability in the measurement, an indication of novel data, or it may be the result of experimental error; the latter are ...
s, so that if the Gaussian model is questionable or approximate, there may advantages to using the median (see Robust statistics).


Dominant estimators

If T_1 and T_2 are estimators for the parameter \theta, then T_1 is said to dominate T_2 if: # its mean squared error (MSE) is smaller for at least some value of \theta # the MSE does not exceed that of T_2 for any value of θ. Formally, T_1 dominates T_2 if : \operatorname (T_1 - \theta)^2 \leq \operatorname (T_2-\theta)^2 holds for all \theta, with strict inequality holding somewhere.


Relative efficiency

The relative efficiency of two unbiased estimators is defined as : e(T_1,T_2) = \frac = \frac Although e is in general a function of \theta, in many cases the dependence drops out; if this is so, e being greater than one would indicate that T_1 is preferable, regardless of the true value of \theta. An alternative to relative efficiency for comparing estimators, is the
Pitman closeness criterion In statistical theory, the Pitman closeness criterion, named after E. J. G. Pitman, is a way of comparing two candidate estimators for the same parameter. Under this criterion, estimator A is preferred to estimator B if the probability that estim ...
. This replaces the comparison of mean-squared-errors with comparing how often one estimator produces estimates closer to the true value than another estimator. If T_1 and T_2 are estimators for the parameter \theta, then T_1 is said to dominate T_2 if: # its mean squared error (MSE) is smaller for at least some value of \theta # the MSE does not exceed that of T_2 for any value of θ. Formally, T_1 dominates T_2 if : \mathrm \left (T_1 - \theta)^2 \right\leq \mathrm \left (T_2-\theta)^2 \right holds for all \theta, with strict inequality holding somewhere.


Estimators of the mean of u.i.d. variables

In estimating the mean of uncorrelated, identically distributed variables we can take advantage of the fact that the variance of the sum is the sum of the variances. In this case efficiency can be defined as the square of the
coefficient of variation In probability theory and statistics, the coefficient of variation (CV), also known as relative standard deviation (RSD), is a standardized measure of dispersion of a probability distribution or frequency distribution. It is often expressed as ...
, i.e., : e \equiv \left(\frac \right)^2 Relative efficiency of two such estimators can thus be interpreted as the relative sample size of one required to achieve the certainty of the other. Proof: : \frac = \frac. Now because s_1^2 = n_1 \sigma^2, \, s_2^2 = n_2 \sigma^2 we have \frac = \frac, so the relative efficiency expresses the relative sample size of the first estimator needed to match the variance of the second.


Robustness

Efficiency of an estimator may change significantly if the distribution changes, often dropping. This is one of the motivations of robust statistics – an estimator such as the sample mean is an efficient estimator of the population mean of a normal distribution, for example, but can be an inefficient estimator of a mixture distribution of two normal distributions with the same mean and different variances. For example, if a distribution is a combination of 98% ''N''(''μ,'' ''σ'') and 2% ''N''(''μ,'' 10''σ''), the presence of extreme values from the latter distribution (often "contaminating outliers") significantly reduces the efficiency of the sample mean as an estimator of ''μ.'' By contrast, the trimmed mean is less efficient for a normal distribution, but is more robust (i.e., less affected) by changes in the distribution, and thus may be more efficient for a mixture distribution. Similarly, the shape of a distribution, such as skewness or
heavy tails In probability theory, heavy-tailed distributions are probability distributions whose tails are not exponentially bounded: that is, they have heavier tails than the exponential distribution. In many applications it is the right tail of the distrib ...
, can significantly reduce the efficiency of estimators that assume a symmetric distribution or thin tails.


Uses of inefficient estimators

While efficiency is a desirable quality of an estimator, it must be weighed against other considerations, and an estimator that is efficient for certain distributions may well be inefficient for other distributions. Most significantly, estimators that are efficient for clean data from a simple distribution, such as the normal distribution (which is symmetric, unimodal, and has thin tails) may not be robust to contamination by outliers, and may be inefficient for more complicated distributions. In robust statistics, more importance is placed on robustness and applicability to a wide variety of distributions, rather than efficiency on a single distribution. M-estimators are a general class of solutions motivated by these concerns, yielding both robustness and high relative efficiency, though possibly lower efficiency than traditional estimators for some cases. These are potentially very computationally complicated, however. A more traditional alternative are L-estimators, which are very simple statistics that are easy to compute and interpret, in many cases robust, and often sufficiently efficient for initial estimates. See applications of L-estimators for further discussion.


Efficiency in statistics

Efficiency in statistics is important because they allow one to compare the performance of various estimators. Although an unbiased estimator is usually favored over a biased one, a more efficient biased estimator can sometimes be more valuable than a less efficient unbiased estimator. For example, this can occur when the values of the biased estimator gathers around a number closer to the true value. Thus, estimator performance can be predicted easily by comparing their mean squared errors or variances.


Hypothesis tests

For comparing significance tests, a meaningful measure of efficiency can be defined based on the sample size required for the test to achieve a given task power. Pitman efficiency and
Bahadur efficiency Bahadur may refer to: * Bahadur, a form of Baghatur, an honorific title * Bahadur Fort, in Ahmednagar district, Maharashtra, India * Bahadur (comics), an Indian comic book superhero * ''Bahadur'' (film), a 1953 Indian film * Bahadur (character), ...
(or Hodges–Lehmann efficiency) relate to the comparison of the performance of
statistical hypothesis testing A statistical hypothesis test is a method of statistical inference used to decide whether the data at hand sufficiently support a particular hypothesis. Hypothesis testing allows us to make probabilistic statements about population parameters. ...
procedures. The Encyclopedia of Mathematics provides
brief exposition
of these three criteria.


Experimental design

For experimental designs, efficiency relates to the ability of a design to achieve the objective of the study with minimal expenditure of resources such as time and money. In simple cases, the relative efficiency of designs can be expressed as the ratio of the sample sizes required to achieve a given objective.


See also

*
Bayes estimator In estimation theory and decision theory, a Bayes estimator or a Bayes action is an estimator or decision rule that minimizes the posterior expected value of a loss function (i.e., the posterior expected loss). Equivalently, it maximizes the po ...
* Consistent estimator *
Hodges' estimator In statistics, Hodges' estimator (or the Hodges–Le Cam estimator), named for Joseph Hodges, is a famous counterexample of an estimator which is "superefficient", i.e. it attains smaller asymptotic variance than regular efficient estimators. The e ...
*
Optimal instruments In statistics and econometrics, optimal instruments are a technique for improving the efficiency of estimators in ''conditional moment models'', a class of semiparametric models that generate conditional expectation functions. To estimate paramete ...


Notes


References

* *


Further reading

* * {{Statistics, inference, collapsed Estimation theory